Aspects of critical O$(N)$ model with boundary and defect
Autor: | Okuyama, Yoshitaka |
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Rok vydání: | 2024 |
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Druh dokumentu: | Working Paper |
Popis: | In this thesis, we explore the critical phenomena in the presence of extended objects, which we call defects, aiming for a better understanding of the properties of non-local objects ubiquitous in our world and a more practical and realistic study of criticality. To this end, we study the statistical O$(N)$ vector model in $(4-\epsilon)$ dimensions with three kinds of defects: a line defect constructed by smearing an O$(N)$ vector field along one direction and Dirichlet and Neumann boundaries. A conventional approach to critical phenomena would be to perform perturbative calculations using Feynman diagrams and doing renormalization group analysis. But we here also take a different but complementary approach based on three axioms that include conformal symmetry of the theory at the criticality. We apply this axiomatic framework to the critical O$(N)$ model with a defect and reproduce the perturbative results at the leading non-trivial order in $\epsilon$, substantiating the validity of our approach. Along the way, we develop and refine the axiomatic framework to derive anomalous dimensions of the composite operators on the defect that have not been accessible in the existing literature by focusing on the analyticity of the correlation functions. Comment: Dissertation submitted to Department of Physics, University of Tokyo (Dec. 2023). 142 pages, 9 figures. Based on arXiv:2212.04076 and arXiv:2212.04078 |
Databáze: | arXiv |
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