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1. Resolvent expansions of 3D magnetic Schroedinger operators and Pauli operators

Author

Jensen, Arne and Kovarik, Hynek

Subjects
Mathematics - Spectral Theory, Mathematical Physics
Abstract

We obtain asymptotic resolvent expansions at the threshold of the essential spectrum for magnetic Schr\"odinger and Pauli operators in dimension three. These operators are treated as perturbations of the Laplace operator in $L^2(\mathbb{R}^3)$ and $L^2(\mathbb{R}^3;\mathbb{C}^2)$, respectively. The main novelty of our approach is to show that the relative perturbations, which are first order differential operators, can be factorized in suitably chosen auxiliary spaces. This allows us to derive the desired asymptotic expansions of the resolvents around zero. We then calculate their leading and sub-leading terms explicitly. Analogous factorization schemes for more general perturbations, including e.g.~finite rank perturbations, are discussed as well.

Published
2023

2. Discrete approximations to Dirichlet and Neumann Laplacians on a half-space and norm resolvent convergence

Author

Cornean, Horia, Garde, Henrik, and Jensen, Arne

Subjects
Mathematics - Functional Analysis, Mathematical Physics, Mathematics - Numerical Analysis, Mathematics - Spectral Theory, 47A10, 47A58, 47B39
Abstract

We extend recent results on discrete approximations of the Laplacian in $\mathbf{R}^d$ with norm resolvent convergence to the corresponding results for Dirichlet and Neumann Laplacians on a half-space. The resolvents of the discrete Dirichlet/Neumann Laplacians are embedded into the continuum using natural discretization and embedding operators. Norm resolvent convergence to their continuous counterparts is proven with a quadratic rate in the mesh size. These results generalize with a limited rate to also include operators with a real, bounded, and H\"older continuous potential, as well as certain functions of the Dirichlet/Neumann Laplacians, including any positive real power. Note (Nov 27, 2024): A corrigendum has been added to the end of the PDF., Comment: 11 pages (original paper) + 3 pages (corrigendum, submitted for publication)

Published
2022
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3. Discrete approximations to Dirac operators and norm resolvent convergence

Author

Cornean, Horia D., Garde, Henrik, and Jensen, Arne

Subjects
Mathematical Physics, Mathematics - Numerical Analysis, Mathematics - Spectral Theory, 47A10, 47B39, 47A58
Abstract

We consider continuous Dirac operators defined on $\mathbf{R}^d$, $d\in\{1,2,3\}$, together with various discrete versions of them. Both forward-backward and symmetric finite differences are used as approximations to partial derivatives. We also allow a bounded, H\"older continuous, and self-adjoint matrix-valued potential, which in the discrete setting is evaluated on the mesh. Our main goal is to investigate whether the proposed discrete models converge in norm resolvent sense to their continuous counterparts, as the mesh size tends to zero and up to a natural embedding of the discrete space into the continuous one. In dimension one we show that forward-backward differences lead to norm resolvent convergence, while in dimension two and three they do not. The same negative result holds in all dimensions when symmetric differences are used. On the other hand, strong resolvent convergence holds in all these cases. Nevertheless, and quite remarkably, a rather simple but non-standard modification to the discrete models, involving the mass term, ensures norm resolvent convergence in general.

Published
2022
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5. Norm resolvent convergence of discretized Fourier multipliers

Author

Cornean, Horia, Garde, Henrik, and Jensen, Arne

Subjects
Mathematics - Functional Analysis, Mathematical Physics, Mathematics - Spectral Theory, 47A10, 47A58, 42B15, (47A11, 47B39)
Abstract

We prove norm estimates for the difference of resolvents of operators and their discrete counterparts, embedded into the continuum using biorthogonal Riesz sequences. The estimates are given in the operator norm for operators on square integrable functions, and depend explicitly on the mesh size for the discrete operators. The operators are a sum of a Fourier multiplier and a multiplicative potential. The Fourier multipliers include the fractional Laplacian and the pseudo-relativistic free Hamiltonian. The potentials are real, bounded, and H\"older continuous. As a side-product, the Hausdorff distance between the spectra of the resolvents of the continuous and discrete operators decays with the same rate in the mesh size as for the norm resolvent estimates. The same result holds for the spectra of the original operators in a local Hausdorff distance., Comment: 26 pages

Published
2020
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6. Continuum limit for lattice Schr\'odinger operators

Author

Isozaki, Hiroshi and Jensen, Arne

Subjects
Mathematical Physics, Mathematics - Spectral Theory, Primary 81U40, Secondary 47A40
Abstract

We study the behavior of solutions of the Helmholtz equation $(- \Delta_{disc,h} - E)u_h = f_h$ on a periodic lattice as the mesh size $h$ tends to 0. Projecting to the eigenspace of a characteristic root $\lambda_h(\xi)$ and using a gauge transformation associated with the Dirac point, we show that the gauge transformed solution $u_h$ converges to that for the equation $(P(D_x) - E)v = g$ for a continuous model on ${\bf R}^d$, where $\lambda_h(\xi) \to P(\xi)$. For the case of the hexagonal and related lattices, {in a suitable energy region}, it converges to that for the Dirac equation. For the case of the square lattice, triangular lattice, {hexagonal lattice (in another energy region)} and subdivision of a square lattice, one can add a scalar potential, and the solution of the lattice Schr{\"o}dinger equation $( - \Delta_{disc,h} +V_{disc,h} - E)u_h = f_h$ converges to that of the continuum Schr{\"o}dinger equation $(P(D_x) + V(x) -E)u = f$.

Published
2020
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7. Hypergeometric expression for the resolvent of the discrete Laplacian in low dimensions

Author

Ito, Kenichi and Jensen, Arne

Subjects
Mathematical Physics, Mathematics - Functional Analysis, 47A10, 47B39
Abstract

We present an explicit formula for the resolvent of the discrete Laplacian on the square lattice, and compute its asymptotic expansions around thresholds in low dimensions. As a by-product we obtain a closed formula for the fundamental solution to the discrete Laplacian. For the proofs we express the resolvent in a general dimension in terms of the Appell--Lauricella hypergeometric function of type $C$ outside a disk encircling the spectrum. In low dimensions it reduces to a generalized hypergeometric function, for which certain transformation formulas are available for the desired expansions.

Published
2020
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8. A solvable model of the breakdown of the adiabatic approximation

Author

Galtbayar, Artbazar, Jensen, Arne, and Yajima, Kenji

Subjects
Mathematical Physics
Abstract

Let $L\geq0$ and $0<\varepsilon\ll1$. Consider the following time-dependent family of $1D$ Schr\"{o}dinger equations with scaled and translated harmonic oscillator potentials $ i\varepsilon\partial_t u_{\varepsilon}=-\tfrac12\partial_x^2u_{\varepsilon}+V(t,x)u_{\varepsilon}$, $u_{\varepsilon}(-L-1,x)=\pi^{-1/4}\exp(-x^2/2) $, where $ V(t,x)= (t+L)^2x^2/2$, $t<-L$, $ V(t,x)= 0$, $-L\leq t \leq L$, and $ V(t,x)=(t-L)^2x^2/2$, $t>L$. The initial value problem is explicitly solvable in terms of Bessel functions. Using the explicit solutions we show that the adiabatic theorem breaks down as $\varepsilon\to 0$. For the case $L=0$ complete results are obtained. The survival probability of the ground state $\pi^{-1/4}\exp(-x^2/2)$ at microscopic time $t=1/\varepsilon$ is $1/\sqrt{2}+O(\varepsilon)$. For $L>0$ the framework for further computations and preliminary results are given., Comment: 18 pages, revised version

Published
2020
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10. A local directional growth estimate of the resolvent norm

Author

Cornean, Horia D., Garde, Henrik, Jensen, Arne, and Knörr, Hans Konrad

Subjects
Mathematics - Spectral Theory, 30D15, 47A10, 15A60
Abstract

We study the resolvent norm of a certain class of closed linear operators on a Hilbert space, including unbounded operators with compact resolvent. It is shown that for any point in the resolvent set there exist directions in which the norm grows at least quadratically with the distance from this point. This provides a new proof not using the maximum principle that the resolvent norm of the considered class cannot have local maxima. Finally, we give new criteria for the existence of local non-degenerate minima of the resolvent norm and provide examples of (un)bounded non-normal operators having this property., Comment: 16 pages, 2 figures

Published
2018

11. Instability of resonances under Stark perturbations

Author

Jensen, Arne and Yajima, Kenji

Subjects
Mathematical Physics, Mathematics - Spectral Theory, Primary 81V10, Secondary 35J10, 35P05, 35P25
Abstract

Let $H^{\varepsilon}=-\frac{d^2}{dx^2}+\varepsilon x +V$, $\varepsilon\geq0$, on $L^2(\mathbf{R})$. Let $V=\sum_{k=1}^Nc_k|\psi_k\rangle\langle\psi_k|$ be a rank $N$ operator, where the $\psi_k\in L^2(\mathbf{R})$ are real, compactly supported, and even. Resonances are defined using analytic scattering theory. The main result is that if $\zeta_n$, ${\rm Im}\zeta_n<0$, are resonances of $H^{\varepsilon_n}$ for a sequence $\varepsilon_n\downarrow0$ as $n\to\infty$ and $\zeta_n\to\zeta_0$ as $n\to\infty$, ${\rm Im}\zeta_0<0$, then $\zeta_0$ is \emph{not} a resonance of $H^0$., Comment: 11 pages

Published
2018
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12. Resolvent expansion for the Schr\'odinger operator on a graph with infinite rays

Author

Ito, Kenichi and Jensen, Arne

Subjects
Mathematics - Spectral Theory, Mathematical Physics, 47A10
Abstract

We consider the Schr\"odinger operator on a combinatorial graph consisting of a finite graph and a finite number of discrete half-lines, all jointed together, and compute an asymptotic expansion of its resolvent around the threshold $0$. Precise expressions are obtained for the first few coefficients of the expansion in terms of the generalized eigenfunctions. This result justifies the classification of threshold types solely by growth properties of the generalized eigenfunctions. By choosing an appropriate free operator a priori possessing no zero eigenvalue or zero resonance we can simplify the expansion procedure as much as that on the single discrete half-line., Comment: 55 pages, minor revisions, final version

Published
2017

15. On the adiabatic theorem when eigenvalues dive into the continuum

Author

Cornean, Horia D., Jensen, Arne, Knörr, Hans Konrad, and Nenciu, Gheorghe

Subjects
Mathematical Physics, Quantum Physics
Abstract

We consider a reduced two-channel model of an atom consisting of a quantum dot coupled to an open scattering channel described by a three-dimensional Laplacian. We are interested in the survival probability of a bound state when the dot energy varies smoothly and adiabatically in time. The initial state corresponds to a discrete eigenvalue which dives into the continuous spectrum and re-emerges from it as the dot energy is varied in time and finally returns to its initial value. Our main result is that for a large class of couplings, the survival probability of this bound state vanishes in the adiabatic limit. At the end of the paper we present a short outlook on how our method may be extended to cover other classes of Hamiltonians; details will be given elsewhere., Comment: 22 pages, 1 figure

Published
2016
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16. Resolvent expansions for the Schr\'odinger operator on the discrete half-line

Author

Ito, Kenichi and Jensen, Arne

Subjects
Mathematical Physics, Mathematics - Spectral Theory
Abstract

Simplified models of transport in mesoscopic systems are often based on a small sample connected to a finite number of leads. The leads are often modelled using the Laplacian on the discrete half-line $\mathbb N$. Detailed studies of the transport near thresholds require detailed information on the resolvent of the Laplacian on the discrete half-line. This paper presents a complete study of threshold resonance states and resolvent expansions at a threshold for the Schr\"odinger operator on the discrete half-line $\mathbb N$ with a general boundary condition. A precise description of the expansion coefficients reveals their exact correspondence to the generalized eigenspaces, or the threshold types. The presentation of the paper is adapted from that of Ito-Jensen [Rev.\ Math.\ Phys.\ {\bf 27} (2015), 1550002 (45 pages)], implementing the expansion scheme of Jensen-Nenciu [Rev.\ Math.\ Phys.\ \textbf{13} (2001), 717--754, \textbf{16} (2004), 675--677] in its full generality., Comment: 36 pages,minor revisions, accepted for publication in Journal of Mathematical Physics

Published
2016

17. Branching form of the resolvent at threshold for multi-dimensional discrete Laplacians

Author

Ito, Kenichi and Jensen, Arne

Subjects
Mathematical Physics, 47A10 (Primary), 47F05, 81Q10 (Secondary)
Abstract

We consider the discrete Laplacian on $\mathbb Z^d$, and compute asymptotic expansions of its resolvent around thresholds embedded in continuous spectrum as well as those at end points. We prove that the resolvent has a square-root branching if $d$ is odd, and a logarithm branching if $d$ is even, and, moreover, obtain explicit expressions for these branching parts involving the Lauricella hypergeometric function. In order to analyze a non-degenerate threshold of general form we use an elementary step-by-step expansion procedure, less dependent on special functions., Comment: Minor typos corrected. Final version

Published
2016
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19. A complete classification of threshold properties for one-dimensional discrete Schr\'{o}dinger operators

Author

Ito, Kenichi and Jensen, Arne

Subjects
Mathematical Physics, Mathematics - Spectral Theory
Abstract

We consider the discrete one-dimensional Schr\"{o}dinger operator $H=H_0+V$, where $(H_0x)[n]=-(x[n+1]+x[n-1]-2x[n])$ and $V$ is a self-adjoint operator on $\ell^2(\mathbb{Z})$ with a decay property given by $V$ extending to a compact operator from $\ell^{\infty,-\beta}(\mathbb{Z})$ to $\ell^{1,\beta}(\mathbb{Z})$ for some $\beta\geq1$. We give a complete description of the solutions to $Hx=0$, and $Hx=4x$, $x\in\ell^{\infty,-\beta}(\mathbb{Z})$. Using this description we give asymptotic expansions of the resolvent of $H$ at the two thresholds $0$ and $4$. One of the main results is a precise correspondence between the solutions to $Hx=0$ and the leading coefficients in the asymptotic expansion of the resolvent around $0$. For the resolvent expansion we implement the expansion scheme of Jensen-Nenciu \cite{JN0, JN1} in the full generality., Comment: 51 pages

Published
2013

20. Metastable states when the Fermi Golden Rule constant vanishes

Author

Cornean, Horia D., Jensen, Arne, and Nenciu, Gheorghe

Subjects
Mathematical Physics
Abstract

Resonances appearing by perturbation of embedded non-degenerate eigenvalues are studied in the case when the Fermi Golden Rule constant vanishes. Under appropriate smoothness properties for the resolvent of the unperturbed Hamiltonian, it is proved that the first order Rayleigh-Schr\"odinger expansion exists. The corresponding metastable states are constructed using this truncated expansion. We show that their exponential decay law has both the decay rate and the error term of order $\varepsilon^4$, where $\varepsilon$ is the perturbation strength., Comment: To appear in Commun. Math. Phys

Published
2013
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22. Memory effects in non-interacting mesoscopic transport

Author

Cornean, Horia D., Jensen, Arne, and Nenciu, Gheorghe

Subjects
Mathematical Physics, Condensed Matter - Mesoscale and Nanoscale Physics
Abstract

Consider a quantum dot coupled to two semi-infinite one-dimensional leads at thermal equilibrium. We turn on adiabatically a bias between the leads such that there exists exactly one discrete eigenvalue both at the beginning and at the end of the switching procedure. It is shown that the expectation on the final bound state strongly depends on the history of the switching procedure. On the contrary, the contribution to the final steady-state corresponding to the continuous spectrum has no memory, and only depends on the initial and final values of the bias., Comment: 17 pages, submitted

Published
2012
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24. Schr\'odinger operators on the half line: Resolvent expansions and the Fermi golden rule at thresholds

Author

Jensen, Arne and Nenciu, Gheorghe

Subjects
Mathematical Physics, Mathematics - Spectral Theory
Abstract

We consider Schr\"odinger operators $H=- \d^2/\d r^2+V$ on $L^2([0,\infty))$ with the Dirichlet boundary condition. The potential $V$ may be local or non-local, with polynomial decay at infinity. The point zero in the spectrum of $H$ is classified, and asymptotic expansions of the resolvent around zero are obtained, with explicit expressions for the leading coefficients. These results are applied to the perturbation of an eigenvalue embedded at zero, and the corresponding modified form of the Fermi golden rule., Comment: 17 pages, 2 figures

Published
2007

36. A novel governance framework for GMO: A tiered, more flexible regulation for GMOs would help to stimulate innovation and public debate

Author

Bratlie, Sigrid, Halvorsen, Kristin, Myskja, Bjørn K, Mellegård, Hilde, Bjorvatn, Cathrine, Frost, Petter, Heiene, Gunnar, Hofmann, Bjørn, Holst‐Jensen, Arne, Holst‐Larsen, Torolf, Malnes, Raino SE, Paus, Benedicte, Sandvig, Bente, Sjøli, Sonja Irene, Skarstein, Birgit, Thorseth, May B, Vagstad, Nils, Våge, Dag Inge, and Borge, Ole J

Published
2019
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38. On Reliability

Author

Holst-Jensen, Arne, Vrålstad, Trude, and Schumacher, Trond

Published
2004

46. Community Monitoring for REDD+ : International Promises and Field Realities

Author

Danielsen, Finn, Adrian, Teis, Brofeldt, Søren, van Noordwijk, Meine, Poulsen, Michael K., Rahayu, Subekti, Rutishauser, Ervan, Theilade, Ida, Widayati, Atiek, An, Ngo The, Bang, Tran Nguyen, Budiman, Arif, Enghoff, Martin, Jensen, Arne E., Kurniawan, Yuyun, Li, Qiaohong, Mingxu, Zhao, Schmidt-Vogt, Dietrich, Prixa, Suoksompong, Thoumtone, Vongvisouk, Warta, Zulfira, and Burgess, Neil

Published
2013

48. Sex-dependent dominance at a single locus maintains variation in age at maturity in salmon

Author

Barson, Nicola J., Aykanat, Tutku, Hindar, Kjetil, Baranski, Matthew, Bolstad, Geir H., Fiske, Peder, Jacq, Celeste, Jensen, Arne J., Johnston, Susan E., Karlsson, Sten, Kent, Matthew, Moen, Thomas, Niemela, Eero, Nome, Torfinn, Naesje, Tor F., Orell, Panu, Romakkaniemi, Atso, Saegrov, Harald, Urdal, Kurt, Erkinaro, Jaakko, Lien, Sigbjorn, and Primmer, Craig R.

Subjects
Genomics -- Research, Evolution -- Research, Salmon -- Research -- Genetic aspects, Single nucleotide polymorphisms -- Research, Environmental issues, Science and technology, Zoology and wildlife conservation
Abstract

Males and females share many traits that have a common genetic basis; however, selection on these traits often differs between the sexes, leading to sexual conflict (1,2). Under such sexual antagonism, theory predicts the evolution of genetic architectures that resolve this sexual conflict (2-5). Yet, despite intense theoretical and empirical interest, the specific loci underlying sexually antagonistic phenotypes have rarely been identified, limiting our understanding of how sexual conflict impacts genome evolution (3,6) and the maintenance of genetic diversity (6,7). Here we identify a large effect locus controlling age at maturity in Atlantic salmon (Salmo salar), an important fitness trait in which selection favours earlier maturation in males than females (8), and show it is a clear example of sex-dependent dominance that reduces intralocus sexual conflict and maintains adaptive variation in wild populations. Using high-density single nucleotide polymorphism data across 57 wild populations and whole genome re-sequencing, we find that the vestigial-like family member 3 gene (VGLL3) exhibits sex-dependent dominance in salmon, promoting earlier and later maturation in males and females, respectively. VGLL3, an adiposity regulator associated with size and age at maturity in humans, explained 39% of phenotypic variation, an unexpectedly large proportion for what is usually considered a highly polygenic trait. Such large effects are predicted under balancing selection from either sexually antagonistic or spatially varying selection (9,10). Our results provide the first empirical example of dominance reversal allowing greater optimization of phenotypes within each sex, contributing to the resolution of sexual conflict in a major and widespread evolutionary trade-off between age and size at maturity. They also provide key empirical evidence for how variation in reproductive strategies can be maintained over large geographical scales. We anticipate these findings will have a substantial impact on population management in a range of harvested species where trends towards earlier maturation have been observed., The importance of balancing selection in maintaining variation in fitness-related traits, which are expected to be under strong selection, is a long-standing question in evolutionary biology (7,11,12), with recent models [...]

Published
2015

49. Discrete approximations to Dirac operators and norm resolvent convergence

Author

Cornean, Horia, Garde, Henrik, and Jensen, Arne

Subjects
47A10, 47B39, 47A58, Dirac operator, discrete Dirac operator, FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Numerical Analysis (math.NA), Mathematics - Spectral Theory, FOS: Mathematics, Mathematics - Numerical Analysis, Geometry and Topology, approximation, Spectral Theory (math.SP), Mathematical Physics
Abstract

We consider continuous Dirac operators defined on $\mathbb{R}^d$, $d\in\{1,2,3\}$, together with various discrete versions of them. Both forward-backward and symmetric finite differences are used as approximations to partial derivatives. We also allow a bounded, Hölder continuous, and self-adjoint matrix-valued potential, which in the discrete setting is evaluated on the mesh. Our main goal is to investigate whether the proposed discrete models converge in norm resolvent sense to their continuous counterparts, as the mesh size tends to zero and up to a natural embedding of the discrete space into the continuous one. In dimension one we show that forward-backward differences lead to norm resolvent convergence, while in dimension two and three they do not. The same negative result holds in all dimensions when symmetric differences are used. On the other hand, strong resolvent convergence holds in all these cases. Nevertheless, and quite remarkably, a rather simple but non-standard modification to the discrete models, involving the mass term, ensures norm resolvent convergence in general. We consider continuous Dirac operators defined on $\mathbb{R}^d$, $d\in\{1,2,3\}$, together with various discrete versions of them. Both forward-backward and symmetric finite differences are used as approximations to partial derivatives. We also allow a bounded, Hölder continuous, and self-adjoint matrix-valued potential, which in the discrete setting is evaluated on the mesh. Our main goal is to investigate whether the proposed discrete models converge in norm resolvent sense to their continuous counterparts, as the mesh size tends to zero and up to a natural embedding of the discrete space into the continuous one. In dimension one we show that forward-backward differences lead to norm resolvent convergence, while in dimension two and three they do not. The same negative result holds in all dimensions when symmetric differences are used. On the other hand, strong resolvent convergence holds in all these cases. Nevertheless, and quite remarkably, a rather simple but non-standard modification to the discrete models, involving the mass term, ensures norm resolvent convergence in general.

Published
2022
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