Supersymmetric dynamics and zeta-functions
Nugzar Makhaldiani
TL;DR
This paper explores the interplay between supersymmetric oscillators, zeta-functions, and cosmological constants, proposing finite approximations and fermionic factorizations to deepen understanding of their mathematical and physical connections.
Contribution
It introduces finite approximations of zeta-functions and analyzes fermion factorization in bosonic statistical sums within a supersymmetric framework.
Findings
Finite approximation methods for zeta-functions.
Fermion factorization of bosonic statistical sums.
Insights into supersymmetric dynamics and cosmological constant mechanisms.
Abstract
Boson, fermion, and super oscillators and (statistical) mechanism of cosmological constant; finite approximation of the zeta-function and fermion factorization of the bosonic statistical sum considered.
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