A New Perturbative Expansion for Fermionic Functional Integrals
Abstract
We construct a power series representation of the integrals of form equation log ∫ dμS(, ) 0.05 cm ef(, , η, η) equation where , and η, η are Grassmann variables on a finite lattice in d ≥slant 2. 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.
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