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Main Authors: Shimamori, Soichiro, Wang, Yifan
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2510.13964
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author Shimamori, Soichiro
Wang, Yifan
author_facet Shimamori, Soichiro
Wang, Yifan
contents We study quenched disorder localized on a $p$-dimensional subspacetime in a $d$-dimensional conformal field theory. Motivated by the logarithmic behavior often associated with disorder, we introduce a defect setup in which bulk local operators transform in ordinary conformal representations, while defect local operators assemble into logarithmic multiplets. We refer to such objects as logarithmic defects and investigate their model-independent properties dictated solely by conformal symmetry and its representation theory, including correlation functions, logarithmic defect operator expansions, and conformal blocks. As a concrete example, we analyze the free scalar theory with a generalized pinning defect subject to random coupling fluctuations, and we identify a half-line of fixed points describing the corresponding logarithmic conformal defects. Along the way, we propose a candidate monotone governing defect renormalization group flows induced by subdimensional disorder. We comment on various generalizations and the broader program of bootstrapping logarithmic defects.
format Preprint
id arxiv_https___arxiv_org_abs_2510_13964
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Subdimensional Disorder and Logarithmic Defect
Shimamori, Soichiro
Wang, Yifan
High Energy Physics - Theory
Disordered Systems and Neural Networks
Statistical Mechanics
We study quenched disorder localized on a $p$-dimensional subspacetime in a $d$-dimensional conformal field theory. Motivated by the logarithmic behavior often associated with disorder, we introduce a defect setup in which bulk local operators transform in ordinary conformal representations, while defect local operators assemble into logarithmic multiplets. We refer to such objects as logarithmic defects and investigate their model-independent properties dictated solely by conformal symmetry and its representation theory, including correlation functions, logarithmic defect operator expansions, and conformal blocks. As a concrete example, we analyze the free scalar theory with a generalized pinning defect subject to random coupling fluctuations, and we identify a half-line of fixed points describing the corresponding logarithmic conformal defects. Along the way, we propose a candidate monotone governing defect renormalization group flows induced by subdimensional disorder. We comment on various generalizations and the broader program of bootstrapping logarithmic defects.
title Subdimensional Disorder and Logarithmic Defect
topic High Energy Physics - Theory
Disordered Systems and Neural Networks
Statistical Mechanics
url https://arxiv.org/abs/2510.13964