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Main Authors: Yabunaka, Shunsuke, Delamotte, Bertrand
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2409.17897
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author Yabunaka, Shunsuke
Delamotte, Bertrand
author_facet Yabunaka, Shunsuke
Delamotte, Bertrand
contents We revisit the critical behavior of classical frustrated systems using the nonperturbative renormalization group (NPRG) equation. Our study is performed within the local potential approximation of this equation to which is added the flow of the field renormalization. Our flow equations are functional to avoid possible artifacts coming from the field expansion of the fixed point potential which consists in keeping only a limited number of coupling constants. We explain in detail our numerical implementation, its advantages and the difficulties encountered in the vicinity of $d=2$. For $N$-component spins, the function $N_c(d)$ separating the regions of first and second order transitions in the $(d,N)$ plane is computed for $d$ between 4 and 2.3. Our results confirm what was previously found with cruder approximations of the NPRG equation and contradict both the fixed dimension perturbative approach and some of the results obtained within the conformal bootstrap approach.
format Preprint
id arxiv_https___arxiv_org_abs_2409_17897
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Global fixed point potential approach to frustrated antiferromagnets
Yabunaka, Shunsuke
Delamotte, Bertrand
Statistical Mechanics
We revisit the critical behavior of classical frustrated systems using the nonperturbative renormalization group (NPRG) equation. Our study is performed within the local potential approximation of this equation to which is added the flow of the field renormalization. Our flow equations are functional to avoid possible artifacts coming from the field expansion of the fixed point potential which consists in keeping only a limited number of coupling constants. We explain in detail our numerical implementation, its advantages and the difficulties encountered in the vicinity of $d=2$. For $N$-component spins, the function $N_c(d)$ separating the regions of first and second order transitions in the $(d,N)$ plane is computed for $d$ between 4 and 2.3. Our results confirm what was previously found with cruder approximations of the NPRG equation and contradict both the fixed dimension perturbative approach and some of the results obtained within the conformal bootstrap approach.
title Global fixed point potential approach to frustrated antiferromagnets
topic Statistical Mechanics
url https://arxiv.org/abs/2409.17897