Your search keyword '"Read N"' showing total 1,540 results

1. On the practicalities of producing a nuclear weapon using high-assay low-enriched uranium

Author

Cosgrove, P. and Read, N.

Subjects

Physics - Popular Physics, Physics - Physics and Society

Abstract

It was recently argued by Kemp et al. that HALEU (high-assay low-enriched uranium, or uranium enriched up to 19.75\%) can conceivably be used to produce a nuclear weapon and on this basis civilian enrichment limits should be lowered to 10% or 12%. We find their argument unconvincing in several respects., Comment: 5 pages, 1 figure

Published

2024

2. Structural analysis of Gibbs states and metastates in short-range classical spin glasses: indecomposable metastates, dynamically-frozen states, and metasymmetry

Author

Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Condensed Matter - Disordered Systems and Neural Networks, Mathematical Physics

Abstract

We consider short-range classical spin glasses, or other disordered systems, consisting of Ising spins. For a low-temperature Gibbs state in infinite size in such a system, for given random bonds, it is controversial whether its decomposition into pure states will be trivial or non-trivial. We undertake a general study of the overall structure of this problem, based on metastates, which are essential to prove the existence of a thermodynamic limit. A metastate is a probability distribution on Gibbs states, for given disorder, that satisfies certain covariance properties. First, we prove that any metastate can be decomposed as a mixture of indecomposable metastates, and that all Gibbs states drawn from an indecomposable metastate are alike macroscopically. Next, we consider stochastic stability of a metastate under random perturbations of the disorder, and prove that any metastate is stochastically stable. Using related methods and older results, we prove that if the pure-state decomposition of any Gibbs states drawn from an indecomposable metastate is countably infinite, then the weights in the decomposition follow a Poisson-Dirichlet distribution with a fixed value of the single parameter describing such distributions, and also that if the overlap takes a finite number of values, then the pure states are organized as an ultrametric space, as in $k$-RSB. Dynamically-frozen states play a role in the analysis of Gibbs states drawn from a metastate, either as states or as parts of states. Using a mapping into real Hilbert space, we prove further results about Gibbs states, and classify them into six types. Metastate-average states are studied, and can be related to states arising dynamically at long times after a quench from high temperature, under some conditions., Comment: 69 pages (apologies). v2: new section V C on Poisson-Dirichlet and ultrametricity in type II Gibbs states with overlaps taking only a finite number of values, other smaller changes; now 74 pages

Published

2024

3. Proof of single-replica equivalence in short-range spin glasses

Author

Newman, C. M., Read, N., and Stein, D. L.

Subjects

Condensed Matter - Disordered Systems and Neural Networks, Condensed Matter - Statistical Mechanics, Mathematical Physics

Abstract

We consider short-range Ising spin glasses in equilibrium at infinite system size, and prove that, for fixed bond realization and a given Gibbs state drawn from a suitable metastate, each translation- and locally-invariant function (for example, self-overlaps) of a single pure state in the decomposition of the Gibbs state takes the same value for all the pure states in that Gibbs state. We describe several significant applications to spin glasses., Comment: 5 pages, 0 figures; minor edits of and additions to v.1

Published

2022

4. Metastates and Replica Symmetry Breaking

Author

Newman, C. M., Read, N., and Stein, D. L.

Subjects

Condensed Matter - Disordered Systems and Neural Networks, Condensed Matter - Statistical Mechanics, Mathematical Physics

Abstract

In this review we define and discuss metastates, mathematical tools with general applicability to thermodynamic systems which are particularly useful when working with disordered or inhomogeneous short-range systems. In an infinite such system there may be many competing thermodynamic states, which can lead to the absence of a straightforward thermodynamic limit of local correlation functions. A metastate is a probability measure on the infinite-volume thermodynamic states that restores the connection between those states and the Gibbs states observed in finite volumes. After introducing the basic metastates and discussing their properties, we present possible scenarios for the spin-glass phase and discuss what the metastate approach reveals about how replica symmetry breaking would manifest itself in finite-dimensional short-range spin glasses., Comment: 25 pages

Published

2022

5. Neutronic analysis of high burnup thorium-HALEU fuels in PHWR

Author

Read, N. and Raffuzzi, V.

Published

2024

6. Complexity as information in spin-glass Gibbs states and metastates: upper bounds at nonzero temperature and long-range models

Author

Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Condensed Matter - Disordered Systems and Neural Networks, Mathematical Physics

Abstract

In classical finite-range spin systems, especially those with disorder such as spin glasses, a low-temperature Gibbs state may be a mixture of a number of pure or ordered states; the complexity of the Gibbs state has been defined in the past roughly as the logarithm of this number, assuming the question is meaningful in a finite system. As non-trivial mixtures of pure states do not occur in finite size, in a recent paper [Phys. Rev. E 101, 042114 (2020)] H\"oller and the author introduced a definition of the complexity of an infinite-size Gibbs state as the mutual information between the pure state and the spin configuration in a finite region, and applied this also within a metastate construction. (A metastate is a probability distribution on Gibbs states.) They found an upper bound on the complexity for models of Ising spins in which each spin interacts with only a finite number of others, in terms of the surface area of the region, for all $T\geq 0$. In the present paper, the complexity of a metastate is defined likewise in terms of the mutual information between the Gibbs state and the spin configuration. Upper bounds are found for each of these complexities for general finite-range (i.e. short- or long-range, in a sense we define) mixed $p$-spin interactions of discrete or continuous spins (such as $m$-vector models), but only for $T>0$. For short-range models, the bound reduces to the surface area. For long-range interactions, the definition of a Gibbs state has to be modified, and for these models we also prove that the states obtained within the metastate constructions are Gibbs states under the modified definition. All results are valid for a large class of disorder distributions., Comment: Just over 30 pages. v2: minor changes. v3: filled gap in proof of Prop. 2; published version plus minor corrections

Published

2021

7. Nontrivial maturation metastate-average state in a one-dimensional long-range Ising spin glass: above and below the upper critical range

Author

Jensen, S., Read, N., and Young, A. P.

Subjects

Condensed Matter - Statistical Mechanics, Condensed Matter - Disordered Systems and Neural Networks

Abstract

Understanding the low-temperature pure state structure of spin glasses remains an open problem in the field of statistical mechanics of disordered systems. Here we study Monte Carlo dynamics, performing simulations of the growth of correlations following a quench from infinite temperature to a temperature well below the spin-glass transition temperature $T_c$ for a one-dimensional Ising spin glass model with diluted long-range interactions. In this model, the probability $P_{ij}$ that an edge $\{i,j\}$ has nonvanishing interaction falls as a power-law with chord distance, $P_{ij}\propto1/R_{ij}^{2\sigma}$, and we study a range of values of $\sigma$ with $1/2<\sigma<1$. We consider a correlation function $C_{4}(r,t)$. A dynamic correlation length that shows power-law growth with time $\xi(t)\propto t^{1/z}$ can be identified in the data and, for large time $t$, $C_{4}(r,t)$ decays as a power law $r^{-\alpha_d}$ with distance $r$ when $r\ll \xi(t)$. The calculation can be interpreted in terms of the maturation metastate averaged Gibbs state, or MMAS, and the decay exponent $\alpha_d$ differentiates between a trivial MMAS ($\alpha_d=0$), as expected in the droplet picture of spin glasses, and a nontrivial MMAS ($\alpha_d\ne 0$), as in the replica-symmetry-breaking (RSB) or chaotic pairs pictures. We find nonzero $\alpha_d$ even in the regime $\sigma >2/3$ which corresponds to short-range systems below six dimensions. For $\sigma < 2/3$, the decay exponent $\alpha_d$ follows the RSB prediction for the decay exponent $\alpha_s = 3 - 4 \sigma$ of the static metastate, consistent with a conjectured statics-dynamics relation, while it approaches $\alpha_d=1-\sigma$ in the regime $2/3<\sigma<1$; however, it deviates from both lines in the vicinity of $\sigma=2/3$., Comment: 12 pages, 6 figures. v2: minor changes

Published

2021

8. One-step replica-symmetry-breaking phase below the de Almeida-Thouless line in low-dimensional spin glasses

Author

Höller, J. and Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Condensed Matter - Disordered Systems and Neural Networks

Abstract

The de Almeida-Thouless (AT) line is the phase boundary in the temperature--magnetic field plane of an Ising spin glass at which a continuous (i.e. second-order) transition from a paramagnet to a replica-symmetry-breaking (RSB) phase occurs, according to mean-field theory. Here, using field-theoretic perturbative renormalization group methods on the Bray-Roberts reduced Landau-Ginzburg-type theory for a short-range Ising spin glass in space of dimension $d$, we show that at nonzero magnetic field the nature of the corresponding transition is modified as follows: a) for $d-6$ small and positive, with increasing field on the AT line first, the ordered phase just below the transition becomes the so-called one-step RSB, instead of the full RSB that occurs in mean-field theory; the transition on the AT line remains continuous with a diverging correlation length. Then at a higher field, a tricritical point separates the latter transition from a quasi-first-order one, that is one at which the correlation length does not diverge, and there is a jump in part of the order parameter, but no latent heat. The location of the tricritical point tends to zero as $d\to6^+$; b) for $d\leq 6$, we argue that the quasi-first-order transition could persist down to arbitrarily small nonzero fields, with a transition to full RSB still expected at lower temperature. Whenever the quasi-first-order transition occurs, it is at a higher temperature than the AT transition would be for the same field, preempting it as the temperature is lowered. We also draw attention to the similarity of the "dynamically-frozen" state, which occurs at temperatures just above the quasi-first-order transition, and the "metastate-average state" of the one-step RSB phase, and discuss the issue of the number of pure states in either., Comment: 17 pages, 2 figures. v2: minor changes and corrections, new Appendix, added references; 20 pages. v3: published version. v4: typo fixed in eq. (2.5)

Published

2019

9. Non-Hermitian adiabatic transport in spaces of exceptional points

Author

Höller, J., Read, N., and Harris, J. G. E.

Subjects

Physics - Classical Physics, Condensed Matter - Mesoscale and Nanoscale Physics, Mathematical Physics, Physics - Optics, Quantum Physics

Abstract

We consider the space of $n \times n$ non-Hermitian Hamiltonians ($n=2$, $3$, . . .) that are equivalent to a single $n\times n$ Jordan block. We focus on adiabatic transport around a closed path (i.e. a loop) within this space, in the limit as the time-scale $T=1/\varepsilon$ taken to traverse the loop tends to infinity. We show that, for a certain class of loops and a choice of initial state, the state returns to itself and acquires a complex phase that is $\varepsilon^{-1}$ times an expansion in powers of $\varepsilon^{1/n}$. The exponential of the term of $n$th order (which is equivalent to the "geometric" or Berry phase modulo $2\pi$), is thus independent of $\varepsilon$ as $\varepsilon\to0$; it depends only on the homotopy class of the loop and is an integer power of $e^{2\pi i/n}$. One of the conditions under which these results hold is that the state being transported is, for all points on the loop, that of slowest decay., Comment: 4+3 pages. v2: slight title change; 9 pages, now in regular article format; as published

Published

2018

10. Multicritical point on the de Almeida-Thouless line in spin glasses in $d>6$ dimensions

Author

Moore, M. A. and Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Condensed Matter - Disordered Systems and Neural Networks

Abstract

The de Almeida-Thouless (AT) line in Ising spin glasses is the phase boundary in the temperature $T$ and magnetic field $h$ plane below which replica symmetry is broken. Using perturbative renormalization group (RG) methods, we show that when the dimension $d$ of space is just above $6$ there is a multicritical point (MCP) on the AT line, which separates a low-field regime, in which the critical exponents have mean-field values, from a high-field regime where the RG flows run away to infinite coupling strength; as $d$ approaches $6$ from above, the location of the MCP approaches the zero-field critical point exponentially in $1/(d-6)$. Thus on the AT line perturbation theory for the critical properties breaks down at sufficiently large magnetic field even above $6$ dimensions, as well as for all non-zero fields when $d\leq 6$ as was known previously. We calculate the exponents at the MCP to first order in $\varepsilon=d-6>0$. The fate of the MCP as $d$ increases from just above 6 to infinity is not known., Comment: 5 pages. V2: published version, minor changes

Published

2018

11. Triviality of the ground-state metastate in long-range Ising spin glasses in one dimension

Author

Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Condensed Matter - Disordered Systems and Neural Networks, Mathematical Physics

Abstract

We consider the one-dimensional model of a spin glass with independent Gaussian-distributed random interactions, that have mean zero and variance $1/|i-j|^{2\sigma}$, between the spins at sites $i$ and $j$ for all $i\neq j$. It is known that, for $\sigma>1$, there is no phase transition at any non-zero temperature in this model. We prove rigorously that, for $\sigma>3/2$, any Newman-Stein metastate for the ground states (i.e.\ the frequencies with which distinct ground states are observed in finite size samples in the limit of infinite size, for given disorder) is trivial and unique. In other words, for given disorder and asymptotically at large sizes, the same ground state, or its global spin flip, is obtained (almost) always. The proof consists of two parts: one is a theorem (based on one by Newman and Stein for short-range two-dimensional models), valid for all $\sigma>1$, that establishes triviality under a convergence hypothesis on something similar to the energies of domain walls, and the other (based on older results for the one-dimensional model) establishes that the hypothesis is true for $\sigma>3/2$. In addition, we derive heuristic scaling arguments and rigorous exponent inequalities which tend to support the validity of the hypothesis under broader conditions. The constructions of various metastates are extended to all values $\sigma>1/2$. Triviality of the metastate in bond-diluted power-law models for $\sigma>1$ is proved directly., Comment: 18 pages. v2: subsection on bond-diluted models added, few extra references. 19 pages. v3: published version; a few changes; 20 pages

Published

2017

12. Compactly-supported Wannier functions and algebraic $K$-theory

Author

Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Materials Science, Mathematical Physics, Quantum Physics

Abstract

In a tight-binding lattice model with $n$ orbitals (single-particle states) per site, Wannier functions are $n$-component vector functions of position that fall off rapidly away from some location, and such that a set of them in some sense span all states in a given energy band or set of bands; compactly-supported Wannier functions are such functions that vanish outside a bounded region. They arise not only in band theory, but also in connection with tensor-network states for non-interacting fermion systems, and for flat-band Hamiltonians with strictly short-range hopping matrix elements. In earlier work, it was proved that for general complex band structures (vector bundles) or general complex Hamiltonians---that is, class A in the ten-fold classification of Hamiltonians and band structures---a set of compactly-supported Wannier functions can span the vector bundle only if the bundle is topologically trivial, in any dimension $d$ of space, even when use of an overcomplete set of such functions is permitted. This implied that, for a free-fermion tensor network state with a non-trivial bundle in class A, any strictly short-range parent Hamiltonian must be gapless. Here, this result is extended to all ten symmetry classes of band structures without additional crystallographic symmetries, with the result that in general the non-trivial bundles that can arise from compactly-supported Wannier-type functions are those that may possess, in each of $d$ directions, the non-trivial winding that can occur in the same symmetry class in one dimension, but nothing else. The results are obtained from a very natural usage of algebraic $K$-theory, based on a ring of polynomials in $e^{\pm ik_x}$, $e^{\pm ik_y}$, . . . , which occur as entries in the Fourier-transformed Wannier functions., Comment: 27 pages. V2: proof in Section III simplified and self-contained; fixed an issue of trivial versus stably trivial; now 29 pages. V3: References correctly ordered

Published

2016

13. Comment on 'Galilean invariance at quantum Hall edge'

Author

Höller, J. and Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics

Abstract

In a recent paper by S. Moroz, C. Hoyos, and L. Radzihovsky [Phys. Rev. B 91, 195409 (2015)], it is claimed that the conductivity at low frequency $\omega$ and small wavevector $q$ along the edge of a quantum Hall (QH) system (that possesses Galilean invariance along the edge) contains a universal contribution of order $q^2$ that is determined by the orbital spin per particle in the bulk of the system, or alternatively by the shift of the ground state. (These quantities are known to be related to the Hall viscosity of the bulk.) In this Comment we calculate the real part of the conductivity, integrated over $\omega$, in this regime for the edge of a system of non-interacting electrons filling either the lowest, or the lowest $\nu$ ($\nu=1$, $2$, . . .), Landau level(s), and show that the $q^2$ term is non-universal and depends on details of the confining potential at the edge. In the special case of a linear potential, a form similar to the prediction is obtained, it is possible that this corrected form of the prediction may also hold for fractional QH states in systems with special forms of interactions between electrons., Comment: 5 pages. v2: published version

Published

2016

14. Youth with Special Education Needs in Justice Settings. NDTAC Fact Sheet

Author

National Evaluation and Technical Assistance Center for the Education of Children and Youth Who Are Neglected, Delinquent, or At-Risk (NDTAC) and Read, N. W.

Abstract

Many youth involved with the juvenile justice system have education-related disabilities and are eligible for special education and related services under the Federal Individuals with Disabilities Education Act (IDEA). In most cases, the rates of disabilities in the court-involved youth population are much greater than those in the general youth population. This fact sheet explores the prevalence of these youth within justice settings and describes the characteristics and challenges of serving these young people.

Published

2014

15. Fractional Chern Insulators in Bands with Zero Berry Curvature

Author

Simon, Steven H., Harper, Fenner, and Read, N.

Subjects

Condensed Matter - Strongly Correlated Electrons, Condensed Matter - Mesoscale and Nanoscale Physics

Abstract

Even if a noninteracting system has zero Berry curvature everywhere in the Brillouin zone, it is possible to introduce interactions that stabilise a fractional Chern insulator. These interactions necessarily break time-reversal symmetry (either spontaneously or explicitly) and have the effect of altering the underlying band structure. We outline a number of ways in which this may be achieved, and show how similar interactions may also be used to create a (time-reversal symmetric) fractional topological insulator. While our approach is rigorous in the limit of long range interactions, we show numerically that even for short range interactions a fractional Chern insulator can be stabilised in a band with zero Berry curvature., Comment: 7 pages, 2 figures; Published version

Published

2015

16. Topological central charge from Berry curvature: gravitational anomalies in trial wavefunctions for topological phases

Author

Bradlyn, Barry and Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Strongly Correlated Electrons, High Energy Physics - Theory

Abstract

We show that the topological central charge of a topological phase can be directly accessed from the ground-state wavefunctions for a system on a surface as a Berry curvature produced by adiabatic variation of the metric on the surface, at least up to addition of another topological invariant that arises in some cases. For trial wavefunctions that are given by conformal blocks (chiral correlation functions) in a conformal field theory (CFT), we carry out this calculation analytically, using the hypothesis of generalized screening. The topological central charge is found to be that of the underlying CFT used in the construction, as expected. The calculation makes use of the gravitational anomaly in the chiral CFT. It is also shown that the Hall conductivity can be obtained in an analogous way from the U($1$) gauge anomaly., Comment: 16 pages. v2: small corrections and added references; rearranged final discussion; added material about multicomponent generalization: now 19 pages

Published

2015

17. The periodic sl(2|1) alternating spin chain and its continuum limit as a bulk Logarithmic Conformal Field Theory at c=0

Author

Gainutdinov, A. M., Read, N., Saleur, H., and Vasseur, R.

Subjects

High Energy Physics - Theory, Condensed Matter - Statistical Mechanics, Mathematical Physics, Mathematics - Quantum Algebra, Mathematics - Representation Theory

Abstract

The periodic sl(2|1) alternating spin chain encodes (some of) the properties of hulls of percolation clusters, and is described in the continuum limit by a logarithmic conformal field theory (LCFT) at central charge c=0. This theory corresponds to the strong coupling regime of a sigma model on the complex projective superspace $\mathbb{CP}^{1|1} = \mathrm{U}(2|1) / (\mathrm{U}(1) \times \mathrm{U}(1|1))$, and the spectrum of critical exponents can be obtained exactly. In this paper we push the analysis further, and determine the main representation theoretic (logarithmic) features of this continuum limit by extending to the periodic case the approach of [N. Read and H. Saleur, Nucl. Phys. B 777 316 (2007)]. We first focus on determining the representation theory of the finite size spin chain with respect to the algebra of local energy densities provided by a representation of the affine Temperley-Lieb algebra at fugacity one. We then analyze how these algebraic properties carry over to the continuum limit to deduce the structure of the space of states as a representation over the product of left and right Virasoro algebras. Our main result is the full structure of the vacuum module of the theory, which exhibits Jordan cells of arbitrary rank for the Hamiltonian., Comment: 69pp, 8 figs

Published

2014

18. Short-range Ising spin glasses: the metastate interpretation of replica symmetry breaking

Author

Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Mathematical Physics

Abstract

Parisi's formal replica-symmetry--breaking (RSB) scheme for mean-field spin glasses has long been interpreted in terms of many pure states organized ultrametrically. However, the early version of this interpretation, as applied to the short-range Edwards-Anderson model, runs into problems because as shown by Newman and Stein (NS) it does not allow for chaotic size dependence, and predicts non-self-averaging that cannot occur. NS proposed the concept of the metastate (a probability distribution over infinite-size Gibbs states in a given sample that captures the effects of chaotic size dependence) and a non-standard interpretation of the RSB results in which the metastate is non-trivial and is responsible for what was called non-self-averaging. Here we use the effective field theory of RSB, in conjunction with the rigorous definitions of pure states and the metastate in infinite-size systems, to show that the non-standard picture follows directly from the RSB mean-field theory. In addition, the metastate-averaged state possesses power-law correlations throughout the low temperature phase; the corresponding exponent $\zeta$ takes the value $4$ according to the field theory in high dimensions $d$, and describes the effective fractal dimension of clusters of spins. Further, the logarithm of the number of pure states in the decomposition of the metastate-averaged state that can be distinguished if only correlations in a window of size $W$ can be observed is of order $W^{d-\zeta}$. These results extend the non-standard picture quantitatively; we show that arguments against this scenario are inconclusive., Comment: 32 pages. v2: various small changes and additional references. v3: yet more small changes; published version

Published

2014

19. Low-energy effective theory in the bulk for transport in a topological phase

Author

Bradlyn, Barry and Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, High Energy Physics - Theory

Abstract

We construct a low-energy effective action for a two-dimensional non-relativistic topological (i.e.\ gapped) phase of matter in a continuum, which completely describes all of its bulk electrical, thermal, and stress-related properties in the limit of low frequencies, long distances, and zero temperature, without assuming either Lorentz or Galilean invariance. This is done by generalizing Luttinger's approach to thermoelectric phenomena, via the introduction of a background vielbein (i.e.\ gravitational) field and spin connection a la Cartan, in addition to the electromagnetic vector potential, in the action for the microscopic degrees of freedom (the matter fields). Crucially, the geometry of spacetime is allowed to have timelike and spacelike torsion. These background fields make all natural invariances--- under U(1) gauge transformations, translations in both space and time, and spatial rotations---appear locally, and corresponding conserved currents and the stress tensor can be obtained, which obey natural continuity equations. On integrating out the matter fields, we derive the most general form of a local bulk induced action to first order in derivatives of the background fields, from which thermodynamic and transport properties can be obtained. We show that the gapped bulk cannot contribute to low-temperature thermoelectric transport other than the ordinary Hall conductivity; the other thermoelectric effects (if they occur) are thus purely edge effects. The coupling to "reduced" spacelike torsion is found to be absent in minimally-coupled models, and using a generalized Belinfante stress tensor, the stress response to time-dependent vielbeins (i.e.\ strains) is the Hall viscosity, which is robust against perturbations and related to the spin current as in earlier work., Comment: 20 pages. v2: minor corrections. v3: some corrections and additions, in particular use of "reduced" torsion. Now 21 pages

Published

2014

20. Comment on 'Elementary formula for the Hall conductivity of interacting systems'

Author

Simon, Steven H., Harper, Fenner, and Read, N.

Subjects

Condensed Matter - Strongly Correlated Electrons, Condensed Matter - Mesoscale and Nanoscale Physics

Abstract

In a recent paper by Neupert, Santos, Chamon, and Mudry [Phys. Rev. B 86, 165133 (2012)] it is claimed that there is an elementary formula for the Hall conductivity of fractional Chern insulators. We show that the proposed formula cannot generally be correct, and we suggest one possible source of the error. Our reasoning can be generalized to show no quantity (such as Hall conductivity) expected to be constant throughout an entire phase of matter can possibly be given as the expectation of any time independent short ranged operator., Comment: 6 pages plus 13 pages supplement

Published

2014

21. Providing Individually Tailored Academic and Behavioral Support Services for Youth in the Juvenile Justice and Child Welfare Systems. Practice Guide

Author

National Evaluation and Technical Assistance Center for the Education of Children and Youth Who Are Neglected, Delinquent, or At-Risk (NDTAC), Gonsoulin, S., Darwin, M. J., and Read, N. W.

Abstract

Youth who are involved with the juvenile justice and child welfare systems face many challenges and barriers to academic and vocational success. Regardless of the reasons for their involvement, youth in these systems are "disproportionately children and youth of color who currently have, or have experienced, a host of risk factors that are associated with poor academic achievement, delinquency, recidivism, substance abuse, and mental health issues" (Osher, Gonsoulin, & Lampron, in Leone & Weinberg, 2010, p. 1). Whether due to high rates of mobility, mental and/or behavioral health needs, living in poverty, or delinquent involvement, these youth often face struggles that their non-system-involved peers do not. Specifically, educators need to provide these youth with individually tailored support services to address their academic, behavioral, social, and emotional needs. This guide provides a range of practices and implementation strategies designed to foster a supportive educational system that addresses individual student needs and help students overcome the barriers and challenges to their academic and vocational success. A list of resources and examples is provided. (Contains 1 table and 2 figures.)

Published

2012

22. Fact Sheet: Juvenile Justice Education

Author

National Evaluation and Technical Assistance Center for the Education of Children and Youth Who Are Neglected, Delinquent, or At-Risk (NDTAC), Read, N. W., and O'Cummings, M.

Abstract

Research has demonstrated the correlation between lack of educational attainment and involvement in the juvenile justice system and the importance of education in preventing recidivism. In acknowledgment of the importance of education in the juvenile justice system, more than 2,600 residential juvenile justice facilities report providing education services (Hockenberry, Sickmund, and Sladky, 2009). Around the country, the prevalence and type of education services, screening for grade level and academic needs, student participation in education services, perceived quality of education services, and student academic and vocational outcomes vary. This Fact Sheet examines these aspects of juvenile justice education drawing from three data sources: (1) The Office of Juvenile Justice and Delinquency Prevention's (OJJDP) Juvenile Residential Facility Census (2006); (2) The U.S. Department of Education's Title I, Part D, Consolidated State Performance Reports (school year 2006-07 through 2008-09); and (3) OJJDP's Survey of Youth in Residential Placement (2003).

Published

2011

23. Tensor network trial states for chiral topological phases in two dimensions and a no-go theorem in any dimension

Author

Dubail, J. and Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Strongly Correlated Electrons, High Energy Physics - Theory, Quantum Physics

Abstract

Trial wavefunctions that can be represented by summing over locally-coupled degrees of freedom are called tensor network states (TNSs); they have seemed difficult to construct for two-dimensional topological phases that possess protected gapless edge excitations. We show it can be done for chiral states of free fermions, using a Gaussian Grassmann integral, yielding $p_x \pm i p_y$ and Chern insulator states, in the sense that the fermionic excitations live in a topologically non-trivial bundle of the required type. We prove that any strictly short-range quadratic parent Hamiltonian for these states is gapless; the proof holds for a class of systems in any dimension of space. The proof also shows, quite generally, that sets of compactly-supported Wannier-type functions do not exist for band structures in this class. We construct further examples of TNSs that are analogs of fractional (including non-Abelian) quantum Hall phases; it is not known whether parent Hamiltonians for these are also gapless., Comment: 5 pages plus 4 pages supplementary material, inc 3 figures. v2: improved no-go theorem, additional references. v3: changed to regular article format; 16 pages, 3 figures, no supplemental material; main change is much extended proof of no-go theorem. v4: minor changes; as-published version

Published

2013

24. Entanglement subspaces, trial wavefunctions, and special Hamiltonians in the fractional quantum Hall effect

Author

Jackson, T. S., Read, N., and Simon, S. H.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, High Energy Physics - Theory, Mathematical Physics, Quantum Physics

Abstract

We consider spaces of trial wavefunctions for ground states and edge excitations in the fractional quantum Hall effect that can be obtained in various ways. In one way, functions are obtained by analyzing the entanglement of the ground state wavefunction, partitioned into two parts. In another, functions are defined by the way in which they vanish as several coordinates approach the same value, or by a projection-operator Hamiltonian that enforces those conditions. In a third way, functions are given by conformal blocks from a conformal field theory (CFT). These different spaces of functions are closely related. The use of CFT methods permits an algebraic formulation to be given for all of them. In some cases, we can prove that there is a ground state, a Hamiltonian, and a CFT such that, for any number of particles, all of these spaces are the same. For such cases, this resolves several questions and conjectures: it gives a finite-size bulk-edge correspondence, and we can use the analysis of functions to construct a projection-operator Hamiltonian that produces those functions as zero-energy states. For a model related to the N=1 superconformal algebra, the corresponding Hamiltonian imposes vanishing properties involving only three particles; for this we determine all the wavefunctions explicitly. We do the same for a sequence of models involving the M(3,p) Virasoro minimal models that has been considered previously, using results from the literature. We exhibit the Hamiltonians for the first few cases of these. The techniques we introduce can be applied in numerous examples other than those considered here., Comment: 28 pages. v2: two new appendices, in particular an improved proof of Theorem 2; now 31 pages. v3: minor changes, refs added, as published

Published

2013

25. Logarithmic Conformal Field Theory: a Lattice Approach

Author

Gainutdinov, A. M., Jacobsen, J. L., Read, N., Saleur, H., and Vasseur, R.

Subjects

High Energy Physics - Theory, Condensed Matter - Statistical Mechanics, Mathematical Physics

Abstract

Logarithmic Conformal Field Theories (LCFT) play a key role, for instance, in the description of critical geometrical problems (percolation, self avoiding walks, etc.), or of critical points in several classes of disordered systems (transition between plateaus in the integer and spin quantum Hall effects). Much progress in their understanding has been obtained by studying algebraic features of their lattice regularizations. For reasons which are not entirely understood, the non semi-simple associative algebras underlying these lattice models - such as the Temperley-Lieb algebra or the blob algebra - indeed exhibit, in finite size, properties that are in full correspondence with those of their continuum limits. This applies to the structure of indecomposable modules, but also to fusion rules, and provides an `experimental' way of measuring couplings, such as the `number b' quantifying the logarithmic coupling of the stress energy tensor with its partner. Most results obtained so far have concerned boundary LCFTs, and the associated indecomposability in the chiral sector. While the bulk case is considerably more involved (mixing in general left and right moving sectors), progress has also been made in this direction recently, uncovering fascinating structures. This article provides a short general review of our work in this area., Comment: 44pp, 6 figures, many comments added

Published

2013

26. Edge state inner products and real-space entanglement spectrum of trial quantum Hall states

Author

Dubail, J., Read, N., and Rezayi, E. H.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Strongly Correlated Electrons, High Energy Physics - Theory, Quantum Physics

Abstract

We consider the trial wavefunctions for the Fractional Quantum Hall Effect (FQHE) that are given by conformal blocks, and construct their associated edge excited states in full generality. The inner products between these edge states are computed in the thermodynamic limit, assuming generalized screening (i.e. short-range correlations only) inside the quantum Hall droplet, and using the language of boundary conformal field theory (boundary CFT). These inner products take universal values in this limit: they are equal to the corresponding inner products in the bulk 2d chiral CFT which underlies the trial wavefunction. This is a bulk/edge correspondence; it shows the equality between equal-time correlators along the edge and the correlators of the bulk CFT up to a Wick rotation. This approach is then used to analyze the entanglement spectrum (ES) of the ground state obtained with a bipartition A\cupB in real-space. Starting from our universal result for inner products in the thermodynamic limit, we tackle corrections to scaling using standard field-theoretic and renormalization group arguments. We prove that generalized screening implies that the entanglement Hamiltonian H_E = - log {\rho}_A is isospectral to an operator that is local along the cut between A and B. We also show that a similar analysis can be carried out for particle partition. We discuss the close analogy between the formalism of trial wavefunctions given by conformal blocks and Tensor Product States, for which results analogous to ours have appeared recently. Finally, the edge theory and entanglement spectrum of px + ipy paired superfluids are treated in a similar fashion in the appendix., Comment: 32 pages, 6 figures. V2: discussion of corrections to scaling extended, references added

Published

2012

27. Kubo formulas for viscosity: Hall viscosity, Ward identities, and the relation with conductivity

Author

Bradlyn, Barry, Goldstein, Moshe, and Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Quantum Gases, High Energy Physics - Theory

Abstract

We derive from first principles the Kubo formulas for the stress-stress response function at zero wavevector that can be used to define the full complex frequency-dependent viscosity tensor, both with and without a uniform magnetic field. The formulas in the existing literature are frequently incomplete, incorrect, or lack a derivation; in particular, Hall viscosity is overlooked. Our approach begins from the response to a uniform external strain field, which is an active time-dependent coordinate transformation in d space dimensions. These transformations form the group GL(d,R) of invertible matrices, and the infinitesimal generators are called strain generators. These enable us to express the Kubo formula in different ways, related by Ward identities; some of these make contact with the adiabatic transport approach. For Galilean-invariant systems, we derive a relation between the stress response tensor and the conductivity tensor that is valid at all frequencies and in both the presence and absence of a magnetic field. In the presence of a magnetic field and at low frequency, this yields a relation between the Hall viscosity, the q^2 part of the Hall conductivity, the inverse compressibility (suitably defined), and the diverging part of the shear viscosity (if any); this relation generalizes a result found recently. We show that the correct value of the Hall viscosity at zero frequency can be obtained (at least in the absence of low-frequency bulk and shear viscosity) by assuming that there is an orbital spin per particle that couples to a perturbing electromagnetic field as a magnetization per particle. We study several examples as checks on our formulation., Comment: 32 pages. v2: new Appendix A on derivation of Irving-Kirkwood stress tensor; minor corrections; additional references; now 33 pages

Published

2012

28. Associative algebraic approach to logarithmic CFT in the bulk: the continuum limit of the gl(1|1) periodic spin chain, Howe duality and the interchiral algebra

Author

Gainutdinov, A. M., Read, N., and Saleur, H.

Subjects

High Energy Physics - Theory, Condensed Matter - Statistical Mechanics, Mathematical Physics, Mathematics - Quantum Algebra

Abstract

We develop in this paper the principles of an associative algebraic approach to bulk logarithmic conformal field theories (LCFTs). We concentrate on the closed $gl(1|1)$ spin-chain and its continuum limit - the $c=-2$ symplectic fermions theory - and rely on two technical companion papers, "Continuum limit and symmetries of the periodic gl(1|1) spin chain" [Nucl. Phys. B 871 (2013) 245-288] and "Bimodule structure in the periodic gl(1|1) spin chain" [Nucl. Phys. B 871 (2013) 289-329]. Our main result is that the algebra of local Hamiltonians, the Jones-Temperley-Lieb algebra JTL_N, goes over in the continuum limit to a bigger algebra than the product of the left and right Virasoro algebras. This algebra, S - which we call interchiral, mixes the left and right moving sectors, and is generated, in the symplectic fermions case, by the additional field $S(z,\bar{z})=S_{ab}\psi^a(z)\bar{\psi}^b(\bar{z})$, with a symmetric form $S_{ab}$ and conformal weights (1,1). We discuss in details how the Hilbert space of the LCFT decomposes onto representations of this algebra, and how this decomposition is related with properties of the finite spin-chain. We show that there is a complete correspondence between algebraic properties of finite periodic spin chains and the continuum limit. An important technical aspect of our analysis involves the fundamental new observation that the action of JTL_N in the $gl(1|1)$ spin chain is in fact isomorphic to an enveloping algebra of a certain Lie algebra, itself a non semi-simple version of $sp(N-2)$. The semi-simple part of JTL_N is represented by $Usp(N-2)$, providing a beautiful example of a classical Howe duality, for which we have a non semi-simple version in the full JTL image represented in the spin-chain. On the continuum side, simple modules over the interchiral algebra S are identified with "fundamental" representations of $sp(\infty)$., Comment: 69 pp., 10 figs, v2: the paper has been substantially modified - new proofs, new refs, new App C with inductive limits construction, etc

Published

2012

29. Continuum limit and symmetries of the periodic gl(1|1) spin chain

Author

Gainutdinov, A. M., Read, N., and Saleur, H.

Subjects

High Energy Physics - Theory, Condensed Matter - Statistical Mechanics, Mathematical Physics, Mathematics - Quantum Algebra

Abstract

This paper is the first in a series devoted to the study of logarithmic conformal field theories (LCFT) in the bulk. Building on earlier work in the boundary case, our general strategy consists in analyzing the algebraic properties of lattice regularizations (quantum spin chains) of these theories. In the boundary case, a crucial step was the identification of the space of states as a bimodule over the Temperley Lieb (TL) algebra and the quantum group U_q sl(2). The extension of this analysis in the bulk case involves considerable difficulties, since the U_q sl(2) symmetry is partly lost, while the TL algebra is replaced by a much richer version (the Jones Temperley Lieb - JTL - algebra). Even the simplest case of the gl(1|1) spin chain - corresponding to the c=-2 symplectic fermions theory in the continuum limit - presents very rich aspects, which we will discuss in several papers. In this first work, we focus on the symmetries of the spin chain, that is, the centralizer of the JTL algebra in the alternating tensor product of the gl(1|1) fundamental representation and its dual. We prove that this centralizer is only a subalgebra of U_q sl(2) at q=i that we dub U_q^{odd} sl(2). We then begin the analysis of the continuum limit of the JTL algebra: using general arguments about the regularization of the stress energy-tensor, we identify families of JTL elements going over to the Virasoro generators L_n, \bar{L}_n in the continuum limit. We then discuss the SU(2) symmetry of the (continuum limit) symplectic fermions theory from the lattice and JTL point of view. The analysis of the spin chain as a bimodule over U_q^{odd} sl(2) and JTL is discussed in the second paper of this series., Comment: 43 pp, few comments added

Published

2011

30. Bimodule structure in the periodic gl(1|1) spin chain

Author

Gainutdinov, A. M., Read, N., and Saleur, H.

Subjects

High Energy Physics - Theory, Condensed Matter - Statistical Mechanics, Mathematical Physics, Mathematics - Quantum Algebra, Mathematics - Representation Theory

Abstract

This paper is second in a series devoted to the study of periodic super-spin chains. In our first paper at 2011, we have studied the symmetry algebra of the periodic gl(1|1) spin chain. In technical terms, this spin chain is built out of the alternating product of the gl(1|1) fundamental representation and its dual. The local energy densities - the nearest neighbor Heisenberg-like couplings - provide a representation of the Jones Temperley Lieb (JTL) algebra. The symmetry algebra is then the centralizer of JTL, and turns out to be smaller than for the open chain, since it is now only a subalgebra of U_q sl(2) at q=i, dubbed U_q^{odd} sl(2). A crucial step in our associative algebraic approach to bulk logarithmic conformal field theory (LCFT) is then the analysis of the spin chain as a bimodule over U_q^{odd} sl(2) and JTL. While our ultimate goal is to use this bimodule to deduce properties of the LCFT in the continuum limit, its derivation is sufficiently involved to be the sole subject of this paper. We describe representation theory of the centralizer and then use it to find a decomposition of the periodic gl(1|1) spin chain over JTL for any even number N of tensorands and ultimately a corresponding bimodule structure. Applications of our results to the analysis of the bulk LCFT will then be discussed in the third part of this series., Comment: latex, 42 pp., 13 figures + 5 figures in color, many comments added

Published

2011

31. Real-space entanglement spectrum of quantum Hall systems

Author

Dubail, J., Read, N., and Rezayi, E. H.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Strongly Correlated Electrons, High Energy Physics - Theory, Quantum Physics

Abstract

We study the real-space entanglement spectrum for fractional quantum Hall systems, which maintains locality along the spatial cut, and provide evidence that it possesses a scaling property. We also consider the closely-related particle entanglement spectrum, and carry out the Schmidt decomposition of the Laughlin state analytically at large size., Comment: 5 pages, 4 figures. V2: a bit more on non-locality of OP. V3: typos corrected; as published

Published

2011

32. Entanglement spectra of complex paired superfluids

Author

Dubail, J. and Read, N.

Subjects

Condensed Matter - Strongly Correlated Electrons, Condensed Matter - Mesoscale and Nanoscale Physics, High Energy Physics - Theory, Quantum Physics

Abstract

We study the entanglement in various fully-gapped complex paired states of fermions in two dimensions, focusing on the entanglement spectrum (ES), and using the BCS form of the ground state wavefunction on a cylinder. Certain forms of the pairing functions allow a simple and explicit exact solution for the ES. In the weak-pairing phase of l-wave paired spinless fermions (l odd), the universal low-lying part of the ES consists of |l| chiral Majorana fermion modes [or 2|l| (l even) for spin-singlet states]. For |l|>1, the pseudo-energies of the modes are split in general, but for all l there is a zero--pseudo-energy mode at zero wavevector if the number of modes is odd. This ES agrees with the perturbed conformal field theory of the edge excitations. For more general BCS states, we show how the entanglement gap diverges as a model pairing function is approached., Comment: 4 + epsilon pages. V2: typo fixed and additional reference. V3: small changes and additional reference

Published

2011

33. Hall viscosity, orbital spin, and geometry: paired superfluids and quantum Hall systems

Author

Read, N. and Rezayi, E. H.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Quantum Gases, Condensed Matter - Superconductivity, High Energy Physics - Theory

Abstract

The Hall viscosity, a non-dissipative transport coefficient analogous to Hall conductivity, is considered for quantum fluids in gapped or topological phases. The relation to mean orbital spin per particle discovered in previous work by one of us is elucidated with the help of examples, using the geometry of shear transformations and rotations. For non-interacting particles in a magnetic field, there are several ways to derive the result (even at non-zero temperature), including standard linear response theory. Arguments for the quantization, and the robustness of Hall viscosity to small changes in the Hamiltonian that preserve rotational invariance, are given. Numerical calculations of adiabatic transport are performed to check the predictions for quantum Hall systems, with excellent agreement for trial states. The coefficient of k^4 in the static structure factor is also considered, and shown to be exactly related to the orbital spin and robust to perturbations in rotation invariant systems also., Comment: v2: Now 30 pages, 10 figures; new calculation using disk geometry; some other improvements; no change in results

Published

2010

34. Condensation of fractional excitons, non-Abelian states in double-layer quantum Hall systems and Z_4 parafermions

Author

Rezayi, Edward, Wen, Xiao-Gang, and Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics

Abstract

In this paper, we study a method to obtain non-Abelian FQH state through double-layer FQH states and fractional exciton condensation. In particular, we find that starting with the (330) double-layer state and then increasing the interlayer tunneling strength, we may obtain a single-layer non-Abelian FQH state S(330). We show that the S(330) state is actually the Z_4 parafermion Read-Rezayi state. We also calculate the edge excitation of the S(330) state., Comment: 7 pages, 4 figures

Published

2010

35. Theory of minimum spanning trees II: exact graphical methods and perturbation expansion at the percolation threshold

Author

Jackson, T. S. and Read, N.

Subjects

Condensed Matter - Disordered Systems and Neural Networks, Condensed Matter - Statistical Mechanics, Mathematics - Probability

Abstract

Continuing the program begun by the authors in a previous paper, we develop an exact low-density expansion for the random minimum spanning tree (MST) on a finite graph, and use it to develop a continuum perturbation expansion for the MST on critical percolation clusters in space dimension d. The perturbation expansion is proved to be renormalizable in d=6 dimensions. We consider the fractal dimension D_p of paths on the latter MST; our previous results lead us to predict that D_p=2 for d>d_c=6. Using a renormalization-group approach, we confirm the result for d>6, and calculate D_p to first order in \epsilon=6-d for d\leq 6 using the connection with critical percolation, with the result D_p = 2 - \epsilon/7 + O(\epsilon^2)., Comment: 33 pages, 5 figures, submitted to PRE; part I available at arXiv:0902.3651

Published

2009

36. Universality classes of dense polymers and conformal sigma models

Author

Candu, C., Jacobsen, J. L., Read, N., and Saleur, H.

Subjects

Condensed Matter - Statistical Mechanics

Abstract

In the usual statistical model of a dense polymer (a single space-filling loop on a lattice) in two dimensions the loop does not cross itself. We modify this by including intersections in which {\em three} lines can cross at the same point, with some statistical weight w per crossing. We show that our model describes a line of critical theories with continuously-varying exponents depending on w, described by a conformally-invariant non-linear sigma model with varying coupling constant g_\sigma^2 >0. For the boundary critical behavior, or the model defined in a strip, we propose an exact formula for the \ell-leg exponents, h_\ell=g_\sigma^2 \ell(\ell-2)/8, which is shown numerically to hold very well., Comment: 5 pages

Published

2009

37. Theory of minimum spanning trees I: Mean-field theory and strongly disordered spin-glass model

Author

Jackson, T. S. and Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Mathematics - Probability

Abstract

The minimum spanning tree (MST) is a combinatorial optimization problem: given a connected graph with a real weight ("cost") on each edge, find the spanning tree that minimizes the sum of the total cost of the occupied edges. We consider the random MST, in which the edge costs are (quenched) independent random variables. There is a strongly-disordered spin-glass model due to Newman and Stein [Phys. Rev. Lett. 72, 2286 (1994)], which maps precisely onto the random MST. We study scaling properties of random MSTs using a relation between Kruskal's greedy algorithm for finding the MST, and bond percolation. We solve the random MST problem on the Bethe lattice (BL) with appropriate wired boundary conditions and calculate the fractal dimension D=6 of the connected components. Viewed as a mean-field theory, the result implies that on a lattice in Euclidean space of dimension d, there are of order W^{d-D} large connected components of the random MST inside a window of size W, and that d = d_c = D = 6 is a critical dimension. This differs from the value 8 suggested by Newman and Stein. We also critique the original argument for 8, and provide an improved scaling argument that again yields d_c=6. The result implies that the strongly-disordered spin-glass model has many ground states for d>6, and only of order one below six. The results for MSTs also apply on the Poisson-weighted infinite tree, which is a mean-field approach to the continuum model of MSTs in Euclidean space, and is a limit of the BL. In a companion paper we develop an epsilon=6-d expansion for the random MST on critical percolation clusters., Comment: 18 pages, 3 figures; [v2] figures changed to EPS; [v3] minor changes and section III.H added in response to referee

Published

2009

38. Linking microstructure and processing defects to mechanical properties of selectively laser melted AlSi10Mg alloy

Author

Larrosa, N.O., Wang, W., Read, N., Loretto, M.H., Evans, C., Carr, J., Tradowsky, U., Attallah, M.M., and Withers, P.J.

Published

2018

39. Quasiparticle spin from adiabatic transport in quantum Hall trial wavefunctions

Author

Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics

Abstract

Quasiparticle spin (in the spacetime sense) couples to curvature of space. Here this fact is used to calculate the spin of quasiholes in trial quantum Hall states by adiabatically dragging them around on a sphere, for trial states given by conformal blocks in some conformal field theory. The spin is found to agree with the conformal weight of the corresponding field. The result completes a recent argument that constructions using blocks from non-unitary theories that contain negative quantum dimensions produce contradictions that prevent them from describing topological (gapped) phases of matter., Comment: 5 pages

Published

2008

40. Non-Abelian adiabatic statistics and Hall viscosity in quantum Hall states and p_x+ip_y paired superfluids

Author

Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Strongly Correlated Electrons, High Energy Physics - Theory

Abstract

Many trial wavefunctions for fractional quantum Hall states in a single Landau level are given by functions called conformal blocks, taken from some conformal field theory. Also, wavefunctions for certain paired states of fermions in two dimensions, such as p_x+ip_y states, reduce to such a form at long distances. Here we investigate the adiabatic transport of such many-particle trial wavefunctions using methods from two-dimensional field theory. One context for this is to calculate the statistics of widely-separated quasiholes, which has been predicted to be non-Abelian in a variety of cases. The Berry phase or matrix (holonomy) resulting from adiabatic transport around a closed loop in parameter space is the same as the effect of analytic continuation around the same loop with the particle coordinates held fixed (monodromy), provided the trial functions are orthonormal and holomorphic in the parameters so that the Berry vector potential (or connection) vanishes. We show that this is the case (up to a simple area term) for paired states (including the Moore-Read quantum Hall state), and present general conditions for it to hold for other trial states (such as the Read-Rezayi series). We argue that trial states based on a non-unitary conformal field theory do not describe a gapped topological phase, at least in many cases. By considering adiabatic variation of the aspect ratio of the torus, we calculate the Hall viscosity, a non-dissipative viscosity coefficient analogous to Hall conductivity, for paired states, Laughlin states, and more general quantum Hall states. Hall viscosity is an invariant within a topological phase, and is generally proportional to the "conformal spin density" in the ground state., Comment: 44 pages, RevTeX; v2 minor changes; v3 typos corrected, three small additions

Published

2008

41. Conformal invariance of chiral edge theories

Author

Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, High Energy Physics - Theory

Abstract

The low-energy effective quantum field theory of the edge excitations of a fully-gapped bulk topological phase corresponding to a local interaction Hamiltonian must be local and unitary. Here it is shown that whenever all the edge excitations propagate in the same direction with the same velocity, it is a conformal field theory. In particular, this is the case in the quantum Hall effect for model "special Hamiltonians", for which the ground state, quasihole, and edge excitations can be found exactly as zero-energy eigenstates, provided the spectrum in the interior of the system is fully gapped. In addition, other conserved quantities in the bulk, such as particle number and spin, lead to affine Lie algebra symmetries in the edge theory. Applying the arguments to some trial wavefunctions related to non-unitary conformal field theories, it is argued that the Gaffnian state and an infinite number of others cannot describe a gapped topological phase because the numbers of edge excitations do not match any unitary conformal field theory., Comment: RevTeX, 6 pages. v2: added argument that Gaffnian state cannot be gapped, and additional references. Now 9 pages. v3: minor changes from v2

Published

2007

42. Associative-algebraic approach to logarithmic conformal field theories

Author

Read, N. and Saleur, H.

Subjects

High Energy Physics - Theory, Condensed Matter - Statistical Mechanics, Mathematics - Quantum Algebra

Abstract

We set up a strategy for studying large families of logarithmic conformal field theories by using the enlarged symmetries and non--semi-simple associative algebras appearing in their lattice regularizations (as discussed in a companion paper). Here we work out in detail two examples of theories derived as the continuum limit of XXZ spin-1/2 chains, which are related to spin chains with supersymmetry algebras gl($n|n$) and gl($n+1|n$), respectively, with open (or free) boundary conditions in all cases. These theories can also be viewed as vertex models, or as loop models. Their continuum limits are boundary conformal field theories (CFTs) with central charge $c=-2$ and $c=0$ respectively, and in the loop interpretation they describe dense polymers and the boundaries of critical percolation clusters, respectively. We also discuss the case of dilute (critical) polymers as another boundary CFT with $c=0$. Within the supersymmetric formulations, these boundary CFTs describe the fixed points of certain nonlinear sigma models that have a supercoset space as the target manifold, and of Landau-Ginzburg field theories. The submodule structures of indecomposable representations of the Virasoro algebra appearing in the boundary CFT, representing local fields, are derived from the lattice. A central result is the derivation of the fusion rules for these fields.

Published

2007

43. Enlarged symmetry algebras of spin chains, loop models, and S-matrices

Author

Read, N. and Saleur, H.

Subjects

Condensed Matter - Statistical Mechanics, Condensed Matter - Strongly Correlated Electrons, High Energy Physics - Theory, Mathematics - Quantum Algebra

Abstract

The symmetry algebras of certain families of quantum spin chains are considered in detail. The simplest examples possess m states per site (m\geq2), with nearest-neighbor interactions with U(m) symmetry, under which the sites transform alternately along the chain in the fundamental m and its conjugate representation \bar{m}. We find that these spin chains, even with {\em arbitrary} coefficients of these interactions, have a symmetry algebra A_m much larger than U(m), which implies that the energy eigenstates fall into sectors that for open chains (i.e., free boundary conditions) can be labeled by j=0, 1, >..., L, for the 2L-site chain, such that the degeneracies of all eigenvalues in the jth sector are generically the same and increase rapidly with j. For large j, these degeneracies are much larger than those that would be expected from the U(m) symmetry alone. The enlarged symmetry algebra A_m(2L) consists of operators that commute in this space of states with the Temperley-Lieb algebra that is generated by the set of nearest-neighbor interaction terms; A_m(2L) is not a Yangian. There are similar results for supersymmetric chains with gl(m+n|n) symmetry of nearest-neighbor interactions, and a richer representation structure for closed chains (i.e., periodic boundary conditions). The symmetries also apply to the loop models that can be obtained from the spin chains in a spacetime or transfer matrix picture. In the loop language, the symmetries arise because the loops cannot cross. We further define tensor products of representations (for the open chains) by joining chains end to end. The fusion rules for decomposing the tensor product of representations labeled j_1 and j_2 take the same form as the Clebsch-Gordan series for SU(2). This and other structures turn the symmetry algebra \cA_m into a ribbon Hopf algebra, and we show that this is ``Morita equivalent'' to the quantum group U_q(sl_2) for m=q+q^{-1}. The open-chain results are extended to the cases |m|< 2 for which the algebras are no longer semisimple; these possess continuum limits that are critical (conformal) field theories, or massive perturbations thereof. Such models, for open and closed boundary conditions, arise in connection with disordered fermions, percolation, and polymers (self-avoiding walks), and certain non-linear sigma models, all in two dimensions. A product operation is defined in a related way for the Temperley-Lieb representations also, and the fusion rules for this are related to those for A_m or U_q(sl_2) representations; this is useful for the continuum limits also, as we discuss in a companion paper.

Published

2007

44. Non-Abelian quantized Hall states of electrons at filling factors 12/5 and 13/5 in the first excited Landau level

Author

Rezayi, E. H. and Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Strongly Correlated Electrons

Abstract

We present results of extensive numerical calculations on the ground state of electrons in the first excited (n=1) Landau level with Coulomb interactions, and including non-zero thickness effects, for filling factors 12/5 and 13/5 in the torus geometry. In a region that includes these experimentally-relevant values, we find that the energy spectrum and the overlaps with the trial states support the previous hypothesis that the system is in the non-Abelian k = 3 liquid phase we introduced in a previous paper., Comment: 5 pages (Revtex4), 7 figures

Published

2006

45. A model of hyphal tip growth involving microtubule-based transport

Author

Sugden, K. E. P., Evans, M. R., Poon, W. C. K., and Read, N. D.

Subjects

Quantitative Biology - Subcellular Processes, Condensed Matter - Statistical Mechanics

Abstract

We propose a simple model for mass transport within a fungal hypha and its subsequent growth. Inspired by the role of microtubule-transported vesicles, we embody the internal dynamics of mass inside a hypha with mutually excluding particles progressing stochastically along a growing one-dimensional lattice. The connection between long range transport of materials for growth, and the resulting extension of the hyphal tip has not previously been addressed in the modelling literature. We derive and analyse mean-field equations for the model and present a phase diagram of its steady state behaviour, which we compare to simulations. We discuss our results in the context of the filamentous fungus, Neurospora crassa., Comment: 5 pages, 5 figures

Published

2006

46. Wavefunctions and counting formulas for quasiholes of clustered quantum Hall states on a sphere

Author

Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Mathematics - Quantum Algebra

Abstract

The quasiholes of the Read-Rezayi clustered quantum Hall states are considered, for any number of particles and quasiholes on a sphere, and for any degree k of clustering. A set of trial wavefunctions, that are zero-energy eigenstates of a k+1-body interaction, and so are symmetric polynomials that vanish when any k+1 particle coordinates are equal, is obtained explicitly and proved to be both complete and linearly independent. Formulas for the number of states are obtained, without the use of (but in agreement with) conformal field theory, and extended to give the number of states for each angular momentum. An interesting recursive structure emerges in the states that relates those for k to those for k-1. It is pointed out that the same numbers of zero-energy states can be proved to occur in certain one-dimensional models that have recently been obtained as limits of the two-dimensional k+1-body interaction Hamiltonians, using results from the combinatorial literature., Comment: 9 pages. v2: minor corrections; additional references; note added on connection with one-dimensional Hamiltonians of recent interest

Published

2006

47. Incompressible liquid state of rapidly-rotating bosons at filling factor 3/2

Author

Rezayi, E. H., Read, N., and Cooper, N. R.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics

Abstract

Bosons in the lowest Landau level, such as rapidly-rotating cold trapped atoms, are investigated numerically in the specially interesting case in which the filling factor (ratio of particle number to vortex number) is 3/2. When a moderate amount of a longer-range (e.g. dipolar) interaction is included, we find clear evidence that the ground state is in a phase constructed earlier by two of us, in which excitations possess non-Abelian statistics., Comment: 5 pages, 5 figures

Published

2005

48. Minimum spanning trees and random resistor networks in d dimensions

Author

Read, N.

Subjects

Condensed Matter - Statistical Mechanics, Mathematical Physics, Mathematics - Probability

Abstract

We consider minimum-cost spanning trees, both in lattice and Euclidean models, in d dimensions. For the cost of the optimum tree in a box of size L, we show that there is a correction of order L^theta, where theta < 0 is a universal d-dependent exponent. There is a similar form for the change in optimum cost under a change in boundary condition. At non-zero temperature T, there is a crossover length xi approx equal to T^{-nu}, such that on length scales larger than xi, the behavior becomes that of uniform spanning trees. There is a scaling relation theta=-1/nu, and we provide several arguments that show that nu and -1/theta both equal nu_perc, the correlation length exponent for ordinary percolation in the same dimension d, in all dimensions d > 1. The arguments all rely on the close relation of Kruskal's greedy algorithm for the minimum spanning tree, percolation, and (for some arguments) random resistor networks. The scaling of the entropy and free energy at small non-zero T, and hence of the number of near-optimal solutions, is also discussed. We suggest that the Steiner tree problem is in the same universality class as the minimum spanning tree in all dimensions, as is the traveling salesman problem in two dimensions. Hence all will have the same value of theta=-3/4 in two dimensions., Comment: 19 pages. v2: minor changes in introduction, extra reference

Published

2005

49. Localization in disordered superconducting wires with broken spin-rotation symmetry

Author

Gruzberg, Ilya A., Read, N., and Vishveshwara, Smitha

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics, Condensed Matter - Disordered Systems and Neural Networks, Mathematical Physics

Abstract

Localization and delocalization of non-interacting quasiparticle states in a superconducting wire are reconsidered, for the cases in which spin-rotation symmetry is absent, and time-reversal symmetry is either broken or unbroken; these are referred to as symmetry classes BD and DIII, respectively. We show that, if a continuum limit is taken to obtain a Fokker-Planck (FP) equation for the transfer matrix, as in some previous work, then when there are more than two scattering channels, all terms that break a certain symmetry are lost. It was already known that the resulting FP equation exhibits critical behavior. The additional symmetry is not required by the definition of the symmetry classes; terms that break it arise from non-Gaussian probability distributions, and may be kept in a generalized FP equation. We show that they lead to localization in a long wire. When the wire has more than two scattering channels, these terms are irrelevant at the short distance (diffusive or ballistic) fixed point, but as they are relevant at the long-distance critical fixed point, they are termed dangerously irrelevant. We confirm the results in a supersymmetry approach for class BD, where the additional terms correspond to jumps between the two components of the sigma model target space. We consider the effect of random $\pi$ fluxes, which prevent the system localizing. We show that in one dimension the transitions in these two symmetry classes, and also those in the three chiral symmetry classes, all lie in the same universality class.

Published

2004

50. Vortex lattices in the lowest Landau level for confined Bose-Einstein condensates

Author

Cooper, N. R., Komineas, S., and Read, N.

Subjects

Condensed Matter - Mesoscale and Nanoscale Physics

Abstract

We present the results of numerical calculations of the groundstates of weakly-interacting Bose-Einstein condensates containing large numbers of vortices. Our calculations show that these groundstates appear to be close to uniform triangular vortex lattices. However, slight deviations from a uniform triangular lattice have dramatic consequences on the overall particle distribution. In particular, we demonstrate that the overall particle distribution averaged on a lengthscale large compared to the vortex lattice constant is well approximated by a Thomas-Fermi profile., Comment: 5 pages, 4 figures

Published

2004