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Main Authors: Marinho, Andre A., Brito, Francisco A., Viswanathan, G. M., Bezerra, C. G.
Format: Preprint
Published: 2019
Subjects:
Online Access:https://arxiv.org/abs/1906.00340
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author Marinho, Andre A.
Brito, Francisco A.
Viswanathan, G. M.
Bezerra, C. G.
author_facet Marinho, Andre A.
Brito, Francisco A.
Viswanathan, G. M.
Bezerra, C. G.
contents Quantum groups and quantum algebras have received considerable attention in the last decades because they are very useful as mathematical tools of research. Existing proposals for quantum groups have always suggested the idea of deforming a classical object. Motivated by the possibility of anyons in three dimensions ($d=3$), with important consequences to a wide range of fields of physics, in the present work we investigate how the magnetization and other thermodynamic quantities, associated to the Landau diamagnetism problem, depend on the deforming parameter of two models with intermediate statistics: (i) $q$-fermions and (ii) $F$-anyons, and make {\it comparisons between both cases}. In particular, we extend the results from the literature for $q$-fermions by considering {\it second order terms} in the expansion of the grand partition function. Also, we find that for $F$-anyons statistics the magnetization shows a stronger response with respect to magnetic fields compared to magnetization for $q$-fermions statistics. This theoretical outcome may be experimentally verified for instance in superconductors, that are perfect diamagnetic materials with strong magnetic susceptibility, by adjusting impurities or pressure. The latter can be associated to the deforming parameter $q$.
format Preprint
id arxiv_https___arxiv_org_abs_1906_00340
institution arXiv
publishDate 2019
record_format arxiv
spellingShingle Intermediate statistics: addressing the Landau diamagnetism problem
Marinho, Andre A.
Brito, Francisco A.
Viswanathan, G. M.
Bezerra, C. G.
Statistical Mechanics
High Energy Physics - Theory
Quantum groups and quantum algebras have received considerable attention in the last decades because they are very useful as mathematical tools of research. Existing proposals for quantum groups have always suggested the idea of deforming a classical object. Motivated by the possibility of anyons in three dimensions ($d=3$), with important consequences to a wide range of fields of physics, in the present work we investigate how the magnetization and other thermodynamic quantities, associated to the Landau diamagnetism problem, depend on the deforming parameter of two models with intermediate statistics: (i) $q$-fermions and (ii) $F$-anyons, and make {\it comparisons between both cases}. In particular, we extend the results from the literature for $q$-fermions by considering {\it second order terms} in the expansion of the grand partition function. Also, we find that for $F$-anyons statistics the magnetization shows a stronger response with respect to magnetic fields compared to magnetization for $q$-fermions statistics. This theoretical outcome may be experimentally verified for instance in superconductors, that are perfect diamagnetic materials with strong magnetic susceptibility, by adjusting impurities or pressure. The latter can be associated to the deforming parameter $q$.
title Intermediate statistics: addressing the Landau diamagnetism problem
topic Statistical Mechanics
High Energy Physics - Theory
url https://arxiv.org/abs/1906.00340