A New Perturbative Expansion for Fermionic Functional Integrals
Mathematical Physics
2020-06-02 v2 Statistical Mechanics
High Energy Physics - Lattice
math.MP
Abstract
We construct a power series representation of the integrals of form \begin{equation} \text{log} \int d\mu_{S}(\psi, \bar{\psi}) \hspace{0.05 cm} e^{f(\psi, \bar{\psi}, \eta, \bar{\eta})} \nonumber \end{equation} where and are Grassmann variables on a finite lattice in . Our expansion has a local structure, is clean and provides an easy alternative to decoupling expansion and Mayer-type cluster expansions in any analysis. As an example, we show exponential decay of 2-point truncated correlation function (uniform in volume) in massive Gross-Neveu model on a unit lattice.
Cite
@article{arxiv.1910.07102,
title = {A New Perturbative Expansion for Fermionic Functional Integrals},
author = {Abhishek Goswami},
journal= {arXiv preprint arXiv:1910.07102},
year = {2020}
}
Comments
16 pages, minor changes