Calculating eigenvalues of many-body systems from partition functions

TL;DR

This paper introduces a statistical mechanics-based method to compute eigenvalues of many-body systems directly from thermodynamic data, avoiding the need to solve for eigenfunctions, with applications to quantum exchange energies and topological effects.

Contribution

A novel approach for extracting eigenvalues from thermodynamic quantities in many-body systems, bypassing eigenfunction calculations, and improving existing relations in the literature.

Findings

Successfully calculated eigenvalues for several many-body systems.

Applied the method to quantum exchange energies.

Analyzed the impact of topological effects on eigenvalues.

Abstract

A method for calculating the eigenvalue of a many-body system without solving the eigenfunction is suggested. In many cases, we only need the knowledge of eigenvalues rather than eigenfunctions, so we need a method solving only the eigenvalue, leaving alone the eigenfunction. In this paper, the method is established based on statistical mechanics. In statistical mechanics, calculating thermodynamic quantities needs only the knowledge of eigenvalues and then the information of eigenvalues is embodied in thermodynamic quantities. The method suggested in the present paper is indeed a method for extracting the eigenvalue from thermodynamic quantities. As applications, we calculate the eigenvalues for some many-body systems. Especially, the method is used to calculate the quantum exchange energies in quantum many-body systems. Using the method, we also\ calculate the influence of the topological effect on eigenvalues. Moreover, we improve the result of the relation between the counting function and the heat kernel in literature.