Quantum Reports (Dec 2023)

Applications of Supersymmetric Polynomials in Statistical Quantum Physics

  • Iryna Chernega,
  • Mariia Martsinkiv,
  • Taras Vasylyshyn,
  • Andriy Zagorodnyuk

DOI
https://doi.org/10.3390/quantum5040043
Journal volume & issue
Vol. 5, no. 4
pp. 683 – 697

Abstract

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We propose a correspondence between the partition functions of ideal gases consisting of both bosons and fermions and the algebraic bases of supersymmetric polynomials on the Banach space of absolutely summable two-sided sequences ℓ1(Z0). Such an approach allows us to interpret some of the combinatorial identities for supersymmetric polynomials from a physical point of view. We consider a relation of equivalence for ℓ1(Z0), induced by the supersymmetric polynomials, and the semi-ring algebraic structures on the quotient set with respect to this relation. The quotient set is a natural model for the set of energy levels of a quantum system. We introduce two different topological semi-ring structures into this set and discuss their possible physical interpretations.

Keywords