Parametric Cutoffs for Interacting Fermi Liquids

TL;DR

This paper introduces a new multiscale decomposition of the Fermi propagator that improves momentum preservation and maintains bounds, aiding the rigorous analysis of three-dimensional interacting Fermi systems as Fermi liquids.

Contribution

The authors develop a parametric multiscale decomposition of the Fermi propagator that enhances momentum preservation and retains key bounds, advancing the mathematical analysis of Fermi liquids.

Findings

The new slicing preserves direct space bounds.

Non perturbative bounds on convergent contributions are maintained.

It facilitates the proof that 3D Fermi systems are Fermi liquids.

Abstract

We introduce a new multiscale decomposition of the Fermi propagator based on its parametric representation. We prove that the corresponding sliced propagator obeys the same direct space bounds than the previous decomposition used by the authors. Therefore non perturbative bounds on completely convergent contributions still hold. In addition the new slicing better preserves momenta, hence should become an important new technical tool for the rigorous analysis of condensed matter systems. In particular it should allow to complete the proof that a three dimensional interacting system of Fermions with spherical Fermi surface is a Fermi liquid in the sense of Salmhofer's criterion.