Your search keyword '"Suzuki, Hiroshi"' showing total 128 results

1. Action of the axial $U(1)$ non-invertible symmetry on the 't~Hooft line operator: A simple argument

Author

Honda, Yamato, Onoda, Soma, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

Employing the modified Villain lattice formulation of the axion quantum electrodynamics, we present an alternative and much simpler derivation of the conclusion of~Ref.~\cite{Honda:2024sdz} that the sweep of the axial $U(1)$ non-invertible symmetry operator over the (non-genuine) gauge invariant 't~Hooft line operator with an integer magnetic charge does not leave any effect. The point is that such a 't~Hooft line can be represented by a boundary of a (non-topological) defect that is invariant under the axial transformation on the axion field., Comment: 15 pages, 1 figure. Added a note and an appendix. The final version to appear in PTEP

Published

2024

2. Action of the axial $U(1)$ non-invertible symmetry on the 't~Hooft line operator: A lattice gauge theory study

Author

Honda, Yamato, Onoda, Soma, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

We study how the symmetry operator of the axial $U(1)$ non-invertible symmetry acts on the 't~Hooft line operator in the $U(1)$ gauge theory by employing the modified Villain-type lattice formulation. We model the axial anomaly by a compact scalar boson, the ``QED axion''. For the gauge invariance, the simple 't~Hooft line operator, which is defined by a line integral of the dual $U(1)$ gauge potential, must be ``dressed'' by the scalar and $U(1)$ gauge fields. A careful consideration on the basis of the anomalous Ward--Takahashi identity containing the 't~Hooft operator with the dressing factor and a precise definition of the symmetry operator on the lattice shows that the symmetry operator leaves no effect when it sweeps out a 't~Hooft loop operator. This result appears inequivalent with the phenomenon concluded in the continuum theory. In an appendix, we demonstrate that the half-space gauging of the magnetic $\mathbb{Z}_N$ 1-form symmetry, when formulated in an appropriate lattice framework, leads to the same conclusion as above. A similar result is obtained for the axion string operator., Comment: 21 pages, 1 figure. The final version to appear in PTEP

Published

2024

3. Yet another lattice formulation of 2D $U(1)$ chiral gauge theory via bosonization

Author

Morikawa, Okuto, Onoda, Soma, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

Recently, lattice formulations of Abelian chiral gauge theory in two dimensions have been devised on the basis of the Abelian bosonization. A salient feature of these 2D lattice formulations is that the gauge invariance is \emph{exactly\/} preserved for anomaly-free theories and thus is completely free from the question of the gauge mode decoupling. In the present paper, we propose a yet another lattice formulation sharing this desired property. A particularly unique point in our formulation is that the vertex operator of the dual scalar field, which carries the vector charge of the fermion and the ``magnetic charge'' in the bosonization, is represented by a ``hole'' excised from the lattice; this is the excision method formulated recently by Abe et al. in a somewhat different context., Comment: 16 pages, 3 figures, the final version to appear in PTEP

Published

2024

4. Lattice realization of the axial $U(1)$ noninvertible symmetry

Author

Honda, Yamato, Morikawa, Okuto, Onoda, Soma, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

In $U(1)$ lattice gauge theory with compact $U(1)$ variables, we construct the symmetry operator, i.e.\ the topological defect, for the axial $U(1)$ noninvertible symmetry. This requires a lattice formulation of chiral gauge theory with an anomalous matter content and we employ the lattice formulation on the basis of the Ginsparg--Wilson relation. The invariance of the symmetry operator under the gauge transformation of the gauge field on the defect is realized, imitating the prescription by Karasik in continuum theory, by integrating the lattice Chern--Simons term on the defect over \emph{smooth\/} lattice gauge transformations. The projection operator for allowed magnetic fluxes on the defect then emerges with lattice regularization. The resulting symmetry operator is manifestly invariant under lattice gauge transformations. In an appendix, we give another way of constructing the symmetry operator on the basis of a 3D $\mathbb{Z}_N$ topological quantum field theory, the level-$N$ BF theory on the lattice., Comment: 47 pages, 5 figures, the final version to appear in PTEP

Published

2024

5. Magnetic operators in 2D compact scalar field theories on the lattice

Author

Abe, Motokazu, Morikawa, Okuto, Onoda, Soma, Suzuki, Hiroshi, and Tanizaki, Yuya

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

In lattice compact gauge theories, we must impose the admissibility condition to have well-defined topological sectors. The admissibility condition, however, usually forbids the presence of magnetic operators, and it is not so trivial if one can study the monopole physics depending on the topological term, such as the Witten effect, on the lattice. In this paper, we address this question in the case of 2D compact scalars as it would be one of the simplest examples having analogues of the monopole and the topological term. To define the magnetic operator, we propose the ``excision method,'' which consists of excising lattice links (or bonds) in an appropriate region containing the monopole and defining the dual lattice in a particular way. The size of the excised region is $O(1)$ in lattice units so that the monopole becomes point-like in the continuum limit. We give the lattice derivation of the 't~Hooft anomalies between the electric and magnetic symmetries and also derive the higher-group-like structure related to the Witten effect., Comment: 21 pages, 4 figures

Published

2023

6. Chiral anomaly as a composite operator in the gradient flow exact renormalization group formalism

Author

Miyakawa, Yuki, Sonoda, Hidenori, and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice

Abstract

The gradient flow exact renormalization group (GFERG) is an idea that incorporates gauge invariant gradient flows into the formalism of the exact renormalization group (ERG). GFERG introduces a Wilson action with a cutoff while keeping vector gauge invariance manifestly. The details of the formalism are still to be worked out. In this paper, we apply GFERG to construct the Wilson action of massless Dirac fermions under the background chiral gauge fields. By formulating the chiral anomaly as a ``composite operator,'' we make the scale invariance of the anomaly manifest. We argue that the same result extends to QCD., Comment: 25 pages

Published

2023

7. Topology of $SU(N)$ lattice gauge theories coupled with $\mathbb{Z}_N$ $2$-form gauge fields

Author

Abe, Motokazu, Morikawa, Okuto, Onoda, Soma, Suzuki, Hiroshi, and Tanizaki, Yuya

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

We extend the definition of L\"uscher's lattice topological charge to the case of $4$d $SU(N)$ gauge fields coupled with $\mathbb{Z}_N$ $2$-form gauge fields. This result is achieved while maintaining the locality, the $SU(N)$ gauge invariance, and $\mathbb{Z}_N$ $1$-form gauge invariance, and we find that the manifest $1$-form gauge invariance plays the central role in our construction. This result gives the lattice regularized derivation of the mixed 't Hooft anomaly in pure $SU(N)$ Yang-Mills theory between its $\mathbb{Z}_N$ $1$-form symmetry and the $\theta$ periodicity., Comment: 20 pages, 3 figures; (v2) minor improvements, refs updated

Published

2023

8. Fractional topological charge in lattice Abelian gauge theory

Author

Abe, Motokazu, Morikawa, Okuto, and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice

Abstract

We construct a non-trivial $U(1)/\mathbb{Z}_q$ principal bundle on~$T^4$ from the compact $U(1)$ lattice gauge field by generalizing L\"uscher's constriction so that the cocycle condition contains $\mathbb{Z}_q$ elements (the 't~Hooft flux). The construction requires an admissibility condition on lattice gauge field configurations. From the transition function so constructed, we have the fractional topological charge that is $\mathbb{Z}_q$ one-form gauge invariant and odd under the lattice time reversal transformation. Assuming a rescaling of the vacuum angle $\theta\to q\theta$ suggested from the Witten effect, our construction provides a lattice implementation of the mixed 't~Hooft anomaly between the $\mathbb{Z}_q$ one-form symmetry and the time reversal symmetry in the $U(1)$ gauge theory with matter fields of charge~$q\in2\mathbb{Z}$ when $\theta=\pi$, which was studied by Honda and Tanizaki [J. High Energy Phys. \textbf{12}, 154 (2020)] in the continuum framework., Comment: 18 pages. The final version to appear in PTEP

Published

2022

9. One-particle irreducible Wilson action in the gradient flow exact renormalization group formalism

Author

Sonoda, Hidenori and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice

Abstract

We define a one-particle irreducible (1PI) Wilson action in the gradient flow exact renormalization group (GFERG) formalism as the Legendre transform of a Wilson action. We consider quantum electrodynamics in particular, and show that the GFERG flow equation preserves the invariance of the 1PI Wilson action (excluding the gauge-fixing term) under the \emph{conventional\/} $U(1)$ gauge transformation. This is in contrast to the invariance of the original Wilson action under a modified $U(1)$ gauge transformation. The global chiral transformation also takes the \emph{conventional\/} form for the 1PI Wilson action. Despite the complexity of the GFERG flow equation, the conventional form of the gauge and global chiral transformations may allow us to introduce a non-perturbative Ansatz for gauge and chiral invariant 1PI Wilson actions., Comment: 21 pages, the final version to appear in PTEP

Published

2022

10. Manifestly gauge invariant exact renormalization group for quantum electrodynamics

Author

Miyakawa, Yuki, Sonoda, Hidenori, and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice

Abstract

We formulate quantum electrodynamics on the basis of gauge (or BRST) covariant diffusion equations of fields. This is a particular example of the gradient flow exact renormalization group (GFERG). The resulting Wilson action fulfills a simple gauge Ward--Takahashi identity. We solve the GFERG equation around the Gaussian fixed point to the second order in gauge coupling and obtain the 1-loop beta function and anomalous dimensions. The anomalous dimension of the electron field coincides with that of the fermion field diffused by a gauge covariant flow equation of L\"uscher., Comment: 37 pages

Published

2021

11. Gradient flow exact renormalization group -- inclusion of fermion fields

Author

Miyakawa, Yuki and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice

Abstract

The gradient flow exact renormalization group (GFERG) is an exact renormalization group motivated by the Yang--Mills gradient flow and its salient feature is a manifest gauge invariance. We generalize this GFERG, originally formulated for the pure Yang--Mills theory, to vector-like gauge theories containing fermion fields, keeping the manifest gauge invariance. For the chiral symmetry we have two options: one possible formulation preserves the conventional form of the chiral symmetry and the other simpler formulation realizes the chiral symmetry in a modified form \`a la Ginsparg--Wilson. We work out a gauge-invariant local Wilson action in quantum electrodynamics to the lowest nontrivial order of perturbation theory. This Wilson action reproduces the correct axial anomaly in~$D=2$., Comment: 23 pages, the final version to appear in PTEP

Published

2021

12. Gradient flow exact renormalization group

Author

Sonoda, Hidenori and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice

Abstract

The gradient flow bears a close resemblance to the coarse graining, the guiding principle of the renormalization group (RG). In the case of scalar field theory, a precise connection has been made between the gradient flow and the RG flow of the Wilson action in the exact renormalization group (ERG) formalism. By imitating the structure of this connection, we propose an ERG differential equation that preserves manifest gauge invariance in Yang--Mills theory. Our construction in continuum theory can be extended to lattice gauge theory., Comment: 22 pages, the final version to appear in PTEP

Published

2020

13. More on the infrared renormalon in $SU(N)$ QCD(adj.) on $\mathbb{R}^3\times S^1$

Author

Ashie, Masahiro, Morikawa, Okuto, Suzuki, Hiroshi, and Takaura, Hiromasa

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice, High Energy Physics - Phenomenology

Abstract

We present additional observations to previous studies on the infrared (IR) renormalon in $SU(N)$ QCD(adj.), the $SU(N)$ gauge theory with $n_W$-flavor adjoint Weyl fermions on~$\mathbb{R}^3\times S^1$ with the $\mathbb{Z}_N$ twisted boundary condition. First, we show that, for arbitrary finite~$N$, a logarithmic factor in the vacuum polarization of the "photon" (the gauge boson associated with the Cartan generators of~$SU(N)$) disappears under the $S^1$~compactification. Since the IR renormalon is attributed to the presence of this logarithmic factor, it is concluded that there is no IR renormalon in this system with finite~$N$. This result generalizes the observation made by Anber and~Sulejmanpasic [J. High Energy Phys.\ \textbf{1501}, 139 (2015)] for $N=2$ and~$3$ to arbitrary finite~$N$. Next, we point out that, although renormalon ambiguities do not appear through the Borel procedure in this system, an ambiguity appears in an alternative resummation procedure in which a resummed quantity is given by a momentum integration where the inverse of the vacuum polarization is included as the integrand. Such an ambiguity is caused by a simple zero at non-zero momentum of the vacuum polarization. Under the decompactification~$R\to\infty$, where $R$ is the radius of the $S^1$, this ambiguity in the momentum integration smoothly reduces to the IR renormalon ambiguity in~$\mathbb{R}^4$. We term this ambiguity in the momentum integration "renormalon precursor". The emergence of the IR renormalon ambiguity in~$\mathbb{R}^4$ under the decompactification can be naturally understood with this notion., Comment: 30 pages, 3 figures, the final version to appear in PTEP

Published

2020

14. Vacuum energy of the supersymmetric $\mathbb{C}P^{N-1}$ model on $\mathbb{R}\times S^1$ in the $1/N$ expansion

Author

Ishikawa, Kosuke, Morikawa, Okuto, Shibata, Kazuya, and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice, High Energy Physics - Phenomenology

Abstract

By employing the $1/N$ expansion, we compute the vacuum energy~$E(\delta\epsilon)$ of the two-dimensional supersymmetric (SUSY) $\mathbb{C}P^{N-1}$ model on~$\mathbb{R}\times S^1$ with $\mathbb{Z}_N$ twisted boundary conditions to the second order in a SUSY-breaking parameter~$\delta\epsilon$. This quantity was vigorously studied recently by Fujimori et\ al.\ using a semi-classical approximation based on the bion, motivated by a possible semi-classical picture on the infrared renormalon. In our calculation, we find that the parameter~$\delta\epsilon$ receives renormalization and, after this renormalization, the vacuum energy becomes ultraviolet finite. To the next-to-leading order of the $1/N$ expansion, we find that the vacuum energy normalized by the radius of the~$S^1$, $R$, $RE(\delta\epsilon)$ behaves as inverse powers of~$\Lambda R$ for~$\Lambda R$ small, where $\Lambda$ is the dynamical scale. Since $\Lambda$ is related to the renormalized 't~Hooft coupling~$\lambda_R$ as~$\Lambda\sim e^{-2\pi/\lambda_R}$, to the order of the $1/N$ expansion we work out, the vacuum energy is a purely non-perturbative quantity and has no well-defined weak coupling expansion in~$\lambda_R$., Comment: 24 pages, 3 figures. Fig. 2 was replaced by a correct one and corresponding descriptions in the text were corrected. A note added. The final version to appear in PTEP

Published

2020

15. Renormalon structure in compactified spacetime

Author

Ishikawa, Kosuke, Morikawa, Okuto, Shibata, Kazuya, Suzuki, Hiroshi, and Takaura, Hiromasa

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice, High Energy Physics - Phenomenology

Abstract

We point out that the location of renormalon singularities in theory on a circle-compactified spacetime $\mathbb{R}^{d-1} \times S^1$ (with a small radius $R \Lambda \ll 1$) can differ from that on the non-compactified spacetime $\mathbb{R}^d$. We argue this under the following assumptions, which are often realized in large $N$ theories with twisted boundary conditions: (i) a loop integrand of a renormalon diagram is volume independent, i.e. it is not modified by the compactification, and (ii) the loop momentum variable along the $S^1$ direction is not associated with the twisted boundary conditions and takes the values $n/R$ with integer $n$. We find that the Borel singularity is generally shifted by $-1/2$ in the Borel $u$-plane, where the renormalon ambiguity of $\mathcal{O}(\Lambda^k)$ is changed to $\mathcal{O}(\Lambda^{k-1}/R)$ due to the circle compactification $\mathbb{R}^d \to \mathbb{R}^{d-1} \times S^1$. The result is general for any dimension $d$ and is independent of details of the quantities under consideration. As an example, we study the $\mathbb{C} P^{N-1}$ model on $\mathbb{R} \times S^1$ with $\mathbb{Z}_N$ twisted boundary conditions in the large $N$ limit., Comment: 15 pages, 1 figure, version to appear in PTEP

Published

2019

16. Infrared renormalon in $SU(N)$ QCD(adj.) on $\mathbb{R}^3\times S^1$

Author

Ashie, Masahiro, Morikawa, Okuto, Suzuki, Hiroshi, Takaura, Hiromasa, and Takeuchi, Kengo

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice, High Energy Physics - Phenomenology

Abstract

We study the infrared renormalon in the gluon condensate in the $SU(N)$ gauge theory with $n_W$-flavor adjoint Weyl fermions (QCD(adj.)) on~$\mathbb{R}^3\times S^1$ with the $\mathbb{Z}_N$ twisted boundary conditions. We rely on the so-called large-$\beta_0$ approximation as a conventional tool to analyze the renormalon, in which only Feynman diagrams that dominate in the large-$n_W$ limit are considered while the coefficient of the vacuum polarization is set by hand to the one-loop beta function~$\beta_0=11/3-2n_W/3$. In the large~$N$ limit within the large-$\beta_0$ approximation, the W-boson, which acquires the twisted Kaluza--Klein momentum, produces the renormalon ambiguity corresponding to the Borel singularity at~$u=2$. This provides an example that the system in the compactified space~$\mathbb{R}^3\times S^1$ possesses the renormalon ambiguity identical to that in the uncompactified space~$\mathbb{R}^4$. We also discuss the subtle issue that the location of the Borel singularity can change depending on the order of two necessary operations., Comment: 24 pages, 1 figure, the final version to appear in PTEP

Published

2019

17. Infrared renormalon in the supersymmetric $\mathbb{C}P^{N-1}$ model on $\mathbb{R}\times S^1$

Author

Ishikawa, Kosuke, Morikawa, Okuto, Nakayama, Akira, Shibata, Kazuya, Suzuki, Hiroshi, and Takaura, Hiromasa

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice, High Energy Physics - Phenomenology

Abstract

In the leading order of the large-$N$ approximation, we study the renormalon ambiguity in the gluon (or, more appropriately, photon) condensate in the 2D supersymmetric $\mathbb{C}P^{N-1}$ model on~$\mathbb{R}\times S^1$ with the $\mathbb{Z}_N$ twisted boundary conditions. In our large~$N$ limit, the combination $\Lambda R$, where $\Lambda$ is the dynamical scale and $R$~is the $S^1$ radius, is kept fixed (we set $\Lambda R\ll1$ so that the perturbative expansion with respect to the coupling constant at the mass scale~$1/R$ is meaningful). We extract the perturbative part from the large-$N$ expression of the gluon condensate and obtain the corresponding Borel transform~$B(u)$. For~$\mathbb{R}\times S^1$, we find that the Borel singularity at~$u=2$, which exists in the system on the uncompactified~$\mathbb{R}^2$ and corresponds to twice the minimal bion action, disappears. Instead, an unfamiliar renormalon singularity \emph{emerges\/} at~$u=3/2$ for the compactified space~$\mathbb{R}\times S^1$. The semi-classical interpretation of this peculiar singularity is not clear because $u=3/2$ is not dividable by the minimal bion action. It appears that our observation for the system on~$\mathbb{R}\times S^1$ prompts reconsideration on the semi-classical bion picture of the infrared renormalon., Comment: 26 pages, 1 figure, the final version to appear in PTEP

Published

2019

18. Derivation of a Gradient Flow from ERG

Author

Sonoda, Hidenori and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice

Abstract

We establish a concrete correspondence between a gradient flow and the renormalization group flow for a generic scalar field theory. We use the exact renormalization group formalism with a particular choice of the cutoff function., Comment: 16 pages, 1 figure

Published

2019

19. Thermodynamics in quenched QCD: energy--momentum tensor with two-loop order coefficients in the gradient flow formalism

Author

Iritani, Takumi, Kitazawa, Masakiyo, Suzuki, Hiroshi, and Takaura, Hiromasa

Subjects

High Energy Physics - Lattice, High Energy Physics - Phenomenology, High Energy Physics - Theory

Abstract

Recently, Harlander et al.\ [Eur.\ Phys.\ J.\ C {\bf 78}, 944 (2018)] have computed the two-loop order (i.e., NNLO) coefficients in the gradient-flow representation of the energy--momentum tensor (EMT) in vector-like gauge theories. In this paper, we study the effect of the two-loop order corrections (and the three-loop order correction for the trace part of the EMT, which is available through the trace anomaly) on the lattice computation of thermodynamic quantities in quenched QCD. The use of the two-loop order coefficients generally reduces the $t$~dependence of the expectation values of the EMT in the gradient-flow representation, where $t$~is the flow time. With the use of the two-loop order coefficients, therefore, the $t\to0$ extrapolation becomes less sensitive to the fit function, the fit range, and the choice of the renormalization scale; the systematic error associated with these factors is considerably reduced., Comment: 20 pages, 15 figures, the final version to appear in PTEP

Published

2018

20. Gradient flow representation of the four-dimensional $\mathcal{N}=2$ super Yang--Mills supercurrent

Author

Kasai, Aya, Morikawa, Okuto, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

In K.~Hieda, A.~Kasai, H.~Makino, and H.~Suzuki, Prog.\ Theor.\ Exp.\ Phys.\ \textbf{2017}, 063B03 (2017), a properly normalized supercurrent in the four-dimensional (4D) $\mathcal{N}=1$ super Yang--Mills theory (SYM) that works within on-mass-shell correlation functions of gauge-invariant operators is expressed in a regularization-independent manner by employing the gradient flow. In the present paper, this construction is extended to the supercurrent in the 4D $\mathcal{N}=2$ SYM. The so-constructed supercurrent will be useful, for instance, for fine tuning of lattice parameters toward the supersymmetric continuum limit in future lattice simulations of the 4D $\mathcal{N}=2$ SYM., Comment: 32 pages, 10 figures, the final version to appear in PTEP

Published

2018

21. Renormalon-free definition of the gluon condensate within the large-$\beta_0$ approximation

Author

Suzuki, Hiroshi and Takaura, Hiromasa

Subjects

High Energy Physics - Phenomenology, High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

We propose a clear definition of the gluon condensate within the large-$\beta_0$ approximation as an attempt toward a systematic argument on the gluon condensate. We define the gluon condensate such that it is free from a renormalon uncertainty, consistent with the renormalization scale independence of each term of the operator product expansion (OPE), and an identical object irrespective of observables. The renormalon uncertainty of $\mathcal{O}(\Lambda^4)$, which renders the gluon condensate ambiguous, is separated from a perturbative calculation by using a recently suggested analytic formulation. The renormalon uncertainty is absorbed into the gluon condensate in the OPE, which makes the gluon condensate free from the renormalon uncertainty. As a result, we can define the OPE in a renormalon-free way. Based on this renormalon-free OPE formula, we discuss numerical extraction of the gluon condensate using the lattice data of the energy density operator defined by the Yang--Mills gradient flow., Comment: 24 pages, 7 figures. The final version to appear in PTEP

Published

2018

22. Numerical study of the $\mathcal{N}=2$ Landau--Ginzburg model

Author

Morikawa, Okuto and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

It is believed that the two-dimensional massless $\mathcal{N}=2$ Wess--Zumino model becomes the $\mathcal{N}=2$ superconformal field theory (SCFT) in the infrared (IR) limit. We examine this theoretical conjecture of the Landau--Ginzburg (LG) description of the $\mathcal{N}=2$ SCFT by numerical simulations on the basis of a supersymmetric-invariant momentum-cutoff regularization. We study a single supermultiplet with cubic and quartic superpotentials. From two-point correlation functions in the IR region, we measure the scaling dimension and the central charge, which are consistent with the conjectured LG description of the $A_2$ and $A_3$ minimal models, respectively. Our result supports the theoretical conjecture and, at the same time, indicates a possible computational method of correlation functions in the $\mathcal{N}=2$ SCFT from the LG description., Comment: 35 pages, 37 figures, the final version to appear PTEP

Published

2018

23. Axial $U(1)$ anomaly in a gravitational field via the gradient flow

Author

Morikawa, Okuto and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, General Relativity and Quantum Cosmology, High Energy Physics - Lattice

Abstract

A regularization-independent universal formula for the energy--momentum tensor in gauge theory in the flat spacetime can be written down by employing the so-called Yang--Mills gradient flow. We examine a possible use of the formula in the calculation of the axial $U(1)$ anomaly in a gravitational field, the anomaly first obtained by Toshiei Kimura [Prog.\ Theor.\ Phys.\ {\bf 42}, 1191 (1969)]. As a general argument indicates, the formula reproduces the correct non-local structure of the (axial $U(1)$ current)--(energy--momentum tensor)--(energy--momentum tensor) triangle diagram in a way that is consistent with the axial $U(1)$ anomaly. On the other hand, the formula does not automatically reproduce the general coordinate (or translation) Ward--Takahashi relation, requiring corrections by local counterterms. This analysis thus illustrates the fact that the universal formula as it stands can be used only in on-shell correlation functions, in which the energy--momentum tensor does not coincide with other composite operators in coordinate space., Comment: 22 pages, the final version to appear in PTEP

Published

2018

24. Gradient flow and the Wilsonian renormalization group flow

Author

Makino, Hiroki, Morikawa, Okuto, and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice

Abstract

The gradient flow is the evolution of fields and physical quantities along a dimensionful parameter~$t$, the flow time. We give a simple argument that relates this gradient flow and the Wilsonian renormalization group (RG) flow. We then illustrate the Wilsonian RG flow on the basis of the gradient flow in two examples that possess an infrared fixed point, the 4D many-flavor gauge theory and the 3D $O(N)$ linear sigma model., Comment: 10 pages, 2 figures, the final version to appear in PTEP. Figures 1 and 2 were wrong due to a mistake in the numerical code and have been replaced by corrected ones. We would like to thank Mizuki Tanaka and Masakiyo Kitazawa for pointing out this to us

Published

2018

25. 4D $\mathcal{N}=1$ SYM supercurrent on the lattice in terms of the gradient flow

Author

Hieda, Kenji, Kasai, Aya, Makino, Hiroki, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

The gradient flow[1-5] gives rise to a versatile method to construct renormalized composite operators in a regularization-independent manner. By adopting this method, the authors of~Refs.[6-9] obtained the expression of Noether currents on the lattice in the cases where the associated symmetries are broken by lattice regularization. We apply the same method to the Noether current associated with supersymmetry, i.e., the supercurrent. We consider the 4D $\mathcal{N}=1$ super Yang--Mills theory and calculate the renormalized supercurrent in the one-loop level in the Wess--Zumino gauge. We then re-express this supercurrent in terms of the flowed gauge and flowed gaugino fields[10]., Comment: 8 pages, proceedings of Lattice2017, Granada, Spain

Published

2017

26. One-loop perturbative coupling of $A$ and $A_\star$ through the chiral overlap operator

Author

Makino, Hiroki, Morikawa, Okuto, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

Recently, Grabowska and Kaplan constructed a four-dimensional lattice formulation of chiral gauge theories on the basis of the chiral overlap operator. At least in the tree-level approximation, the left-handed fermion is coupled only to the original gauge field~$A$, while the right-handed one is coupled only to the gauge field~$A_\star$, a deformation of~$A$ by the gradient flow with infinite flow time. In this paper, we study the fermion one-loop effective action in their formulation. We show that the continuum limit of this effective action contains local interaction terms between $A$ and~$A_\star$, even if the anomaly cancellation condition is met. These non-vanishing terms would lead an undesired perturbative spectrum in the formulation., Comment: 8 pages, 6 figures, talk presented at the 35th International Symposium on Lattice Field Theory, 18-24 June 2017, Granada, Spain

Published

2017

27. 4D $\mathcal{N}=1$ SYM supercurrent in terms of the gradient flow

Author

Hieda, Kenji, Kasai, Aya, Makino, Hiroki, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

The gradient flow and its small flow-time expansion provide a very versatile method to represent renormalized composite operators in a regularization-independent manner. This technique has been utilized to construct typical Noether currents such as the energy--momentum tensor and the axial-vector current in lattice gauge theory. In this paper, we apply the same technique to the supercurrent in the four-dimensional $\mathcal{N}=1$ super Yang--Mills theory (4D $\mathcal{N}=1$ SYM) in the Wess--Zumino gauge. Since this approach provides a priori a representation of the properly normalized conserved supercurrent, our result should be useful, e.g., in lattice numerical simulations of the 4D $\mathcal{N}=1$ SYM; the conservation of the so-constructed supercurrent can be used as a criterion for the supersymmetric point toward which the gluino mass is tuned., Comment: 22 pages, 9 figures

Published

2017

28. Energy--momentum tensor on the lattice: recent developments

Author

Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

It is conceivable that the construction of the energy--momentum tensor (EMT) in lattice field theory enlarges our ability in lattice field theory and also deepens our understanding on EMT at the non-pertubative level. In this talk, I will review recent developments in this enterprise., Comment: 15 pages, plenary talk presented at the 34th annual International Symposium on Lattice Field Theory, 24-30 July 2016, University of Southampton, UK

Published

2016

29. Topological susceptibility in finite temperature (2+1)-flavor QCD using gradient flow

Author

Taniguchi, Yusuke, Kanaya, Kazuyuki, Suzuki, Hiroshi, and Umeda, Takashi

Subjects

High Energy Physics - Lattice, High Energy Physics - Phenomenology, High Energy Physics - Theory

Abstract

We compute the topological charge and its susceptibility in finite temperature (2+1)-flavor QCD on the lattice applying a gradient flow method. With the Iwasaki gauge action and nonperturbatively $O(a)$-improved Wilson quarks, we perform simulations on a fine lattice with~$a\simeq0.07\,\mathrm{fm}$ at a heavy $u$, $d$ quark mass with $m_\pi/m_\rho\simeq0.63$ but approximately physical $s$ quark mass with $m_{\eta_{ss}}/m_\phi\simeq0.74$. In a temperature range from~$T\simeq174\,\mathrm{MeV}$ ($N_t=16$) to $697\,\mathrm{MeV}$ ($N_t=4$), we study two topics on the topological susceptibility. One is a comparison of gluonic and fermionic definitions of the topological susceptibility. Because the two definitions are related by chiral Ward-Takahashi identities, their equivalence is not trivial for lattice quarks which violate the chiral symmetry explicitly at finite lattice spacings. The gradient flow method enables us to compute them without being bothered by the chiral violation. We find a good agreement between the two definitions with Wilson quarks. The other is a comparison with a prediction of the dilute instanton gas approximation, which is relevant in a study of axions as a candidate of the dark matter in the evolution of the Universe. We find that the topological susceptibility shows a decrease in $T$ which is consistent with the predicted $\chi_\mathrm{t}(T) \propto (T/T_{\rm pc})^{-8}$ for three-flavor QCD even at low temperature $T_{\rm pc} < T\le1.5 T_{\rm pc}$., Comment: 18 pages, 4 figures, publised version

Published

2016

30. A dilaton-pion mass relation

Author

Kasai, Aya, Okumura, Ken-ichi, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Phenomenology, High Energy Physics - Theory

Abstract

Recently, Golterman and Shamir presented an effective field theory which is supposed to describe the low-energy physics of the pion and the dilaton in an $SU(N_c)$ gauge theory with $N_f$ Dirac fermions in the fundamental representation. By employing this formulation with a slight but important modification, we derive a relation between the dilaton mass squared~$m_\tau^2$, with and without the fermion mass~$m$, and the pion mass squared~$m_\pi^2$ to the leading order of the chiral logarithm. This is analogous to a similar relation obtained by Matsuzaki and~Yamawaki on the basis of a somewhat different low-energy effective field theory. Our relation reads $m_\tau^2=m_\tau^2|_{m=0}+KN_f\hat{f}_\pi^2m_\pi^2/(2\hat{f}_\tau^2)+O(m_\pi^4\ln m_\pi^2)$ with~$K=9$, where $\hat{f}_\pi$ and~$\hat{f}_\tau$ are decay constants of the pion and the dilaton, respectively. This mass relation differs from the one derived by Matsuzaki and~Yamawaki on the points that $K=(3-\gamma_m)(1+\gamma_m)$, where $\gamma_m$ is the mass anomalous dimension, and the leading chiral logarithm correction is~$O(m_\pi^2\ln m_\pi^2)$. For~$\gamma_m\sim1$, the value of the decay constant~$\hat{f}_\tau$ estimated from our mass relation becomes $\sim50\%$ larger than $\hat{f}_\tau$ estimated from the relation of Matsuzaki and~Yamawaki., Comment: 13 pages

Published

2016

31. Fermion number anomaly with the fluffy mirror fermion

Author

Okumura, Ken-ichi and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Phenomenology, High Energy Physics - Theory

Abstract

Quite recently, Grabowska and Kaplan presented a 4-dimensional lattice formulation of chiral gauge theories based on the chiral overlap operator. We study this formulation from the perspective of the fermion number anomaly and possible associated phenomenology. A simple argument shows that the consistency of the formulation implies that the fermion with the opposite chirality to the physical one, the "fluffy mirror fermion" or "fluff", suffers from the fermion number anomaly in the same magnitude (with the opposite sign) as the physical fermion. This immediately shows that if at least one of the fluff quarks is massless, the formulation provides a simple viable solution to the strong CP problem. Also, if the fluff interacts with gravity essentially in the same way as the physical fermion, the formulation can realize the asymmetric dark matter scenario., Comment: 10 pages, the final version to appear in PTEP

Published

2016

32. Small flow-time representation of fermion bilinear operators

Author

Hieda, Kenji and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

Fermion bilinear operators of mass dimension~$3$, such as the axial-vector and vector currents, the pseudo-scalar and scalar densities, whose normalizations are fixed by Ward--Takahashi (WT) relations, are related to small flow-time behavior of composite operators of fermion fields evolved by L\"uscher's flow equation. The representations can be useful in lattice numerical simulations, as recently demonstrated by the WHOT QCD collaboration for the chiral condensation of the $N_f=2+1$ quantum chromodynamics (QCD) at finite temperature., Comment: 15 pages, 4 figures. In previous versions, the coefficient in Eq. (2.7) was wrong and this mistake propagated to subsequent equations, Eqs. (2.9), (2.15), (2.17), (2.30), (2.31), (2.33), (2.35), (3.3), (3.7), (3.11), (3.13), and (4.2). We would like to thank Robert Harlander for pointing this out to us

Published

2016

33. Upper bound on the mass anomalous dimension in many-flavor gauge theories: a conformal bootstrap approach

Author

Iha, Hisashi, Makino, Hiroki, and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, High Energy Physics - Lattice, High Energy Physics - Phenomenology

Abstract

We study four-dimensional conformal field theories with an $SU(N)$ global symmetry by employing the numerical conformal bootstrap. We consider the crossing relation associated with a four-point function of a spin~$0$ operator~$\phi_i^{\Bar{k}}$ which belongs to the adjoint representation of $SU(N)$. For~$N=12$ for example, we found that the theory contains a spin~$0$ $SU(12)$-breaking relevant operator when the scaling dimension of~$\phi_i^{\Bar{k}}$, $\Delta_{\phi_i^{\Bar{k}}}$, is smaller than~$1.71$. Considering the lattice simulation of many-flavor quantum chromodynamics with $12$~flavors on the basis of the staggered fermion, the above $SU(12)$-breaking relevant operator, if it exists, would be induced by the flavor-breaking effect of the staggered fermion and prevent an approach to an infrared fixed point. Actual lattice simulations do not show such signs. Thus, assuming the absence of the above $SU(12)$-breaking relevant operator, we have an upper bound on the mass anomalous dimension at the fixed point~$\gamma_m^*\leq1.29$ from the relation~$\gamma_m^*=3-\Delta_{\phi_i^{\Bar{k}}}$. Our upper bound is not so strong practically but it is strict within the numerical accuracy. We also find a kink-like behavior in the boundary curve for the scaling dimension of another $SU(12)$-breaking operator., Comment: 16 pages, 4 figures, the final version to appear in PTEP

Published

2016

34. Background field method in the gradient flow

Author

Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

The Yang--Mills gradient flow and its extension to the fermion field provide a very general method to obtain renormalized observables in gauge theory. The method is applicable also with non-perturbative regularization such as lattice. The gradient flow thus offers useful probes to study non-perturbative dynamics of gauge theory. In this work, aiming at possible simplification in perturbative calculations associated with the gradient flow, a modification of the gauge-fixed version of the flow equation, which preserves gauge covariance under the background gauge transformation, is proposed. This formulation allows for example a very quick one-loop calculation of the small flow time expansion of a composite operator that is relevant to the construction of a lattice energy--momentum tensor. Some details of the calculation, which have not been given elsewhere, are presented., Comment: 7 pages. Talk given at the 33rd International Symposium on Lattice Field Theory (Lattice 2015), 14-18 July 2015, Kobe International Conference Center, Kobe, Japan

Published

2015

35. Complex Langevin method applied to the 2D $SU(2)$ Yang-Mills theory

Author

Makino, Hiroki, Suzuki, Hiroshi, and Takeda, Daisuke

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

The complex Langevin method in conjunction with the gauge cooling is applied to the two-dimensional lattice $SU(2)$ Yang-Mills theory that is analytically solvable. We obtain strong numerical evidence that at large Langevin time the expectation value of the plaquette variable converges, but to a wrong value when the complex phase of the gauge coupling is large., Comment: 10 pages, 7 figures, the final version to appear in Physical Review D

Published

2015

36. Universal formula for the flavor non-singlet axial-vector current from the gradient flow

Author

Endo, Tasuku, Hieda, Kenji, Miura, Daiki, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Phenomenology, High Energy Physics - Theory

Abstract

By employing the gradient/Wilson flow, we derive a universal formula that expresses a correctly normalized flavor non-singlet axial-vector current of quarks. The formula is universal in the sense that it holds independently of regularization and especially holds with lattice regularization. It is also confirmed that, in the lowest non-trivial order of perturbation theory, the triangle diagram containing the formula and two flavor non-singlet vector currents possesses non-local structure that is compatible with the triangle anomaly., Comment: 11 pages, 7 figures. In previous versions, a coefficient in Eq. (1.4) was wrong and this mistake propagated to subsequent equations, Eqs. (1.6) and (3.14). We would like to thank Robert Harlander for pointing this out to us

Published

2015

37. Universal formula for the energy--momentum tensor via a flow equation in the Gross--Neveu model

Author

Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

For the fermion field in the two-dimensional Gross--Neveu model, we introduce a flow equation that allows a simple $1/N$ expansion. By employing the $1/N$ expansion, we examine the validity of a universal formula for the energy--momentum tensor which is based on the small flow-time expansion. We confirm that the formula reproduces a correct normalization and the conservation law of the energy--momentum tensor by computing the translation Ward--Takahashi relation in the leading non-trivial order in the $1/N$ expansion. Also, we confirm that the expectation value at finite temperature correctly reproduces thermodynamic quantities. These observations support the validity of a similar construction of the energy--momentum tensor via the gradient/Wilson flow in lattice gauge theory., Comment: 16 pages, 7 figures, the final version to appear in PTEP

Published

2015

38. Bosonization in the path integral formulation

Author

Fujikawa, Kazuo and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, Condensed Matter - Strongly Correlated Electrons, High Energy Physics - Lattice

Abstract

We establish the direct $d=2$ on-shell bosonization $\psi_{L}(x_{+})=e^{i\xi(x_{+})}$ and $\psi_{R}^{\dagger}(x_{-})=e^{i\xi(x_{-})}$ in path integral formulation by deriving the off-shell relations $\psi_{L}(x)\psi_{R}^{\dagger}(x)=\exp[i\xi(x)]$ and $\psi_{R}(x)\psi_{L}^{\dagger}(x)=\exp[-i\xi(x)]$. Similarly, the on-shell bosonization of the bosonic commuting spinor, $\phi_{L}(x_{+})=ie^{-i\xi(x_{+})}\partial^{+}e^{-i\chi(x_{+})}$, $\phi^{\dagger}_{R}(x_{-})=e^{-i\xi(x_{-})-i\chi(x_{-})}$ and $\phi_{R}(x_{-})=ie^{i\xi(x_{-})}\partial^{-}e^{+i\chi(x_{-})}$, $\phi^{\dagger}_{L}(x_{+})=e^{i\xi(x_{+})+i\chi(x_{+})}$, is established in path integral formulation by deriving the off-shell relations $\phi_{L}(x)\phi^{\dagger}_{R}(x)=ie^{-i\xi(x)}\partial^{+}e^{-i\chi(x)}$ and $\phi_{R}(x)\phi^{\dagger}_{L}(x)=ie^{i\xi(x)}\partial^{-}e^{i\chi(x)}$., Comment: 18 pages, the final version to appear in Phys. Rev. D

Published

2015

39. Large-$N$ limit of the gradient flow in the 2D $O(N)$ nonlinear sigma model

Author

Makino, Hiroki, Sugino, Fumihiko, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

The gradient flow equation in the 2D $O(N)$ nonlinear sigma model with lattice regularization is solved in the leading order of the $1/N$ expansion. By using this solution, we analytically compute the thermal expectation value of a lattice energy--momentum tensor defined through the gradient flow. The expectation value reproduces thermodynamic quantities obtained by the standard large-$N$ method. This analysis confirms that the above lattice energy--momentum tensor restores the correct normalization automatically in the continuum limit, in a system with a non-perturbative mass gap., Comment: 16 pages, 6 figures, the final version to appear in PTEP

Published

2014

40. Renormalizability of the gradient flow in the 2D $O(N)$ non-linear sigma model

Author

Makino, Hiroki and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

It is known that the gauge field and its composite operators evolved by the Yang--Mills gradient flow are ultraviolet (UV) finite without any multiplicative wave function renormalization. In this paper, we prove that the gradient flow in the 2D $O(N)$ non-linear sigma model possesses a similar property: The flowed $N$-vector field and its composite operators are UV finite without multiplicative wave function renormalization. Our proof in all orders of perturbation theory uses a $(2+1)$-dimensional field theoretical representation of the gradient flow, which possesses local gauge invariance without gauge field. As application of the UV finiteness of the gradient flow, we construct the energy--momentum tensor in the lattice formulation of the $O(N)$ non-linear sigma model that automatically restores the correct normalization and the conservation law in the continuum limit., Comment: 32 pages, 15 figures, the tittle has been changed, the final version to appear in PTEP

Published

2014

41. Lattice energy-momentum tensor from the Yang-Mills gradient flow -- a simpler prescription

Author

Makino, Hiroki and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

In a recent paper [arXiv:1403.4772], we gave a prescription how to construct a correctly-normalized conserved energy--momentum tensor in lattice gauge theory containing fermions, on the basis of the Yang--Mills gradient flow. In the present note, we give an almost identical but somewhat superior prescription with which one can simply set the fermion mass parameter in our formulation zero for the massless fermion. This feature will be useful in applying our formulation to theories in which the masslessness of the fermion is crucial, such as multi-flavor gauge theories with an infrared fixed point., Comment: 10 pages, this preprint is not intended to be published in a journal anymore, because its contents are included in the published version of arXiv:1403.4772

Published

2014

42. Lattice energy-momentum tensor from the Yang-Mills gradient flow -- inclusion of fermion fields

Author

Makino, Hiroki and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

Local products of fields deformed by the so-called Yang--Mills gradient flow become renormalized composite operators. This fact has been utilized to construct a correctly normalized conserved energy--momentum tensor in the lattice formulation of the pure Yang--Mills theory. In the present paper, this construction is further generalized for vector-like gauge theories containing fermions., Comment: 32 pages, added an appendix, errors in the one-loop calculation were corrected

Published

2014

43. Thermodynamics of SU(3) Gauge Theory from Gradient Flow

Author

Asakawa, Masayuki, Hatsuda, Tetsuo, Itou, Etsuko, Kitazawa, Masakiyo, and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Phenomenology, High Energy Physics - Theory, Nuclear Theory

Abstract

A novel method to study the bulk thermodynamics in lattice gauge theory is proposed on the basis of the Yang-Mills gradient flow with a fictitious time t. The energy density (epsilon) and the pressure (P) of SU(3) gauge theory at fixed temperature are calculated directly on 32^3 x (6,8,10) lattices from the thermal average of the well-defined energy-momentum tensor (T_{mu nu}^R(x)) obtained by the gradient flow. It is demonstrated that the continuum limit can be taken in a controlled manner from the t-dependence of the flowed data., Comment: 5 pages, 3 figures; comments and references added (v2), included erratum and all figures are revised (v3)

Published

2013

44. SUSY breaking by nonperturbative dynamics in a matrix model for 2D type IIA superstrings

Author

Endres, Michael G., Kuroki, Tsunehide, Sugino, Fumihiko, and Suzuki, Hiroshi

Subjects

High Energy Physics - Theory, Mathematical Physics

Abstract

We explicitly compute nonperturbative effects in a supersymmetric double-well matrix model corresponding to two-dimensional type IIA superstring theory on a nontrivial Ramond-Ramond background. We analytically determine the full one-instanton contribution to the free energy and one-point function, including all perturbative fluctuations around the one-instanton background. The leading order two-instanton contribution is determined as well. We see that supersymmetry is spontaneously broken by instantons, and that the breaking persists after taking a double scaling limit which realizes the type IIA theory from the matrix model. The result implies that spontaneous supersymmetry breaking occurs by nonperturbative dynamics in the target space of the IIA theory. Furthermore, we numerically determine the full nonperturbative effects by recursive evaluation of orthogonal polynomials. The free energy of the matrix model appears well-defined and finite even in the strongly coupled limit of the corresponding type IIA theory. The result might suggest a weakly coupled theory appearing as an S-dual to the two-dimensional type IIA superstring theory., Comment: 40 pages, 5 figures; v2: comment added; v3: comments and references added, version to be published in Nuclear Physics B; v4: comment and references added

Published

2013

45. Energy-momentum tensor from the Yang-Mills gradient flow

Author

Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

The product of gauge fields generated by the Yang-Mills gradient flow for positive flow times does not exhibit the coincidence-point singularity and a local product is thus independent of the regularization. Such a local product can furthermore be expanded by renormalized local operators at zero flow time with finite coefficients that are governed by renormalization group equations. Using these facts, we derive a formula that relates the small flow-time behavior of certain gauge-invariant local products and the correctly-normalized conserved energy-momentum tensor in the Yang-Mills theory. Our formula provides a possible method to compute the correlation functions of a well-defined energy-momentum tensor by using lattice regularization and Monte Carlo simulation., Comment: 17 pages, 17 figures, errors in the one-loop calculation were corrected

Published

2013

46. Remark on the energy-momentum tensor in the lattice formulation of 4D $\mathcal{N}=1$ SYM

Author

Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

In a recent paper, arXiv:1209.2473 \cite{Suzuki:2012gi}, we presented a possible definition of the energy-momentum tensor in the lattice formulation of the four-dimensional $\mathcal{N}=1$ supersymmetric Yang--Mills theory, that is conserved in the quantum continuum limit. In the present Letter, we propose a quite similar but somewhat different definition of the energy-momentum tensor (that is also conserved in the continuum limit) which is superior in several aspects: In the continuum limit, the origin of the energy automatically becomes consistent with the supersymmetry and the number of renormalization constants that require a (non-perturbative) determination is reduced to two from four, the number of renormalization constants appearing in the construction in Ref. \cite{Suzuki:2012gi}., Comment: 13 pages, the final version to appear in Phys. Lett. B

Published

2012

47. Ferrara--Zumino supermultiplet and the energy-momentum tensor in the lattice formulation of 4D $\mathcal{N}=1$ SYM

Author

Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

It is well-known that Noether currents in the classical four-dimensional $\mathcal{N}=1$ supersymmetric Yang--Mills theory (4D $\mathcal{N}=1$ SYM), i.e., the $U(1)_A$ current, the supersymmetry (SUSY) current and the energy-momentum tensor, form a multiplet under SUSY, called the Ferrara--Zumino supermultiplet. Inspired by this structure, we define the energy-momentum tensor in the lattice formulation of 4D $\mathcal{N}=1$ SYM by a renormalized super transformation of a lattice SUSY current. By using a renormalized SUSY Ward--Takahashi relation, the energy-momentum tensor so constructed is shown to be conserved in the quantum continuum limit. Our construction of the energy-momentum tensor is very explicit and usable in non-perturbative numerical simulations., Comment: 27 pages, the final version to appear in Nucl. Phys. B

Published

2012

48. Supersymmetry, chiral symmetry and the generalized BRS transformation in lattice formulations of 4D $\mathcal{N}=1$ SYM

Author

Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

In the context of the lattice regularization of the four-dimensional $\mathcal{N}=1$ supersymmetric Yang--Mills theory (4D $\mathcal{N}=1$ SYM), we formulate a generalized BRS transformation that treats the gauge, supersymmetry (SUSY), translation and axial U(1) ($U(1)_A$) transformations in a unified way. A resultant Slavnov--Taylor identity or the Zinn-Justin equation gives rise to a strong constraint on the quantum continuum limit of symmetry breaking terms with the lattice regularization. By analyzing the implications of the constraint on operator-mixing coefficients in the SUSY and the $U(1)_A$ Ward-Takahashi (WT) identities, we prove to all orders of perturbation theory in the continuum limit that, (i) the chiral symmetric limit implies the supersymmetric limit and, (ii) a three-fermion operator that might potentially give rise to an exotic breaking of the SUSY WT identity does not emerge. In previous literature, only a naive or incomplete treatment on these points can be found. Our results provide a solid theoretical basis for lattice formulations of the 4D $\mathcal{N}=1$ SYM., Comment: 46 pages, the final version to appear in Nucl. Phys. B

Published

2012

49. Numerical simulation of the $\mathcal{N}=(2,2)$ Landau-Ginzburg model

Author

Kamata, Syo and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

The two-dimensional $\mathcal{N}=(2,2)$ Wess-Zumino (WZ) model with a cubic superpotential is numerically studied with a momentum-cutoff regularization that preserves supersymmetry. A numerical algorithm based on the Nicolai map is employed and the resulting configurations have no autocorrelation. This system is believed to flow to an $\mathcal{N}=(2,2)$ superconformal field theory (SCFT) in the infrared (IR), the $A_2$ model. From a finite-size scaling analysis of the susceptibility of the scalar field in the WZ model, we determine $1-h-\Bar{h}=0.616(25)(13)$ for the conformal dimensions $h$ and $\Bar{h}$, while $1-h-\Bar{h}=0.666...$ for the $A_2$ model. We also measure the central charge in the IR region from a correlation function between conserved supercurrents and obtain $c=1.09(14)(31)$ ($c=1$ for the $A_2$ model). These results are consistent with the conjectured emergence of the $A_2$ model, and at the same time demonstrate that numerical studies can be complementary to analytical investigations for this two-dimensional supersymmetric field theory., Comment: 32 pages, 15 figures, the final version to appear in Nuclear Physics B

Published

2011

50. Supersymmetry restoration in lattice formulations of 2D $\mathcal{N}=(2,2)$ WZ model based on the Nicolai map

Author

Kadoh, Daisuke and Suzuki, Hiroshi

Subjects

High Energy Physics - Lattice, High Energy Physics - Theory

Abstract

For lattice formulations of the two-dimensional $\mathcal{N}=(2,2)$ Wess--Zumino (2D $\mathcal{N}=(2,2)$ WZ) model on the basis of the Nicolai map, we show that supersymmetry (SUSY) and other symmetries are restored in the continuum limit without fine tuning, to all orders in perturbation theory. This provides a theoretical basis for use of these lattice formulations for computation of correlation functions., Comment: 12 pages, uses elsarticle.cls, the final version to appear in Phys. Lett. B

Published

2010