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Main Author: Carvalho, P. R. S.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2506.05537
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author Carvalho, P. R. S.
author_facet Carvalho, P. R. S.
contents In this work we introduce a field-theoretic tool that enable us to evaluate the critical exponents of $δ_{KLS}$-generalized systems undergoing continuous phase transitions, namely $δ_{KLS}$-generalized statistical field theory. It generalizes the standard Boltzmann-Gibbs through the introduction of the $δ_{KLS}$ parameter from which Boltzmann-Gibbs statistics is recovered in the limit $δ_{KLS}\rightarrow 0$. From the results for the critical exponents we provide the referred physical interpretation for the $δ_{KLS}$ parameter. Although new generalized universality classes emerge, we show that they are incomplete for describing the behavior of some real materials. This task is fulfilled only for nonextensive statistical field theory, which is related to fractal derivative and multifractal geometries, up to the moment, for our knowledge.
format Preprint
id arxiv_https___arxiv_org_abs_2506_05537
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On the completeness of the $δ_{KLS}$-generalized statistical field theory
Carvalho, P. R. S.
High Energy Physics - Theory
Statistical Mechanics
Mathematical Physics
In this work we introduce a field-theoretic tool that enable us to evaluate the critical exponents of $δ_{KLS}$-generalized systems undergoing continuous phase transitions, namely $δ_{KLS}$-generalized statistical field theory. It generalizes the standard Boltzmann-Gibbs through the introduction of the $δ_{KLS}$ parameter from which Boltzmann-Gibbs statistics is recovered in the limit $δ_{KLS}\rightarrow 0$. From the results for the critical exponents we provide the referred physical interpretation for the $δ_{KLS}$ parameter. Although new generalized universality classes emerge, we show that they are incomplete for describing the behavior of some real materials. This task is fulfilled only for nonextensive statistical field theory, which is related to fractal derivative and multifractal geometries, up to the moment, for our knowledge.
title On the completeness of the $δ_{KLS}$-generalized statistical field theory
topic High Energy Physics - Theory
Statistical Mechanics
Mathematical Physics
url https://arxiv.org/abs/2506.05537