Advanced Mathematical Techniques in Renormalization of Elastic Models: A Comprehensive Analysis

TL;DR

This paper develops advanced mathematical techniques for renormalizing elastic models and Fermi condensates, improving the understanding of phase transitions, fixed points, and high-temperature behaviors in complex physical systems.

Contribution

It introduces a comprehensive mathematical framework combining tools from quantum field theory and topology to analyze elastic models and Fermi condensates at high temperatures.

Findings

Enhanced calculation of elastic anomalous exponents

Deeper insights into topological structures in phase transitions

Derivation of high-temperature modifications of key equations

Abstract

In this study, we delve into the intricate mathematical frameworks essential for the renormalization of effective elastic models within complex physical systems. By integrating advanced tools such as Laurent series, residue theorem, winding numbers, and path integrals, we systematically address divergent loop integrals encountered in renormalization group analyses. Furthermore, we extend our analysis to higher-order physical models, incorporating techniques from quantum field theory and exploring quantum coherent states in complex systems. This comprehensive approach not only enhances the precision of calculating elastic anomalous exponents but also provides deeper insights into the topological structures underlying phase transitions and fixed-point behaviors. The methodologies developed herein pave the way for future explorations into more intricate many-body systems.This paper presents an extensive mathematical framework aimed at enhancing the complexity and extending the theory of Fermi condensates to high-temperature regimes. By incorporating a range of mathematical formulations from thermodynamics, statistical physics, and quantum field theory, we derive key equations and their high-temperature modifications. The study encompasses corrections to the Fermi-Dirac distribution, thermodynamic quantities of Fermi condensates, pairing gap equations within the BCS theory, correlation functions, modified Hamiltonians, path integral representations, and hydrodynamic equations.