A Feynman integral in Lifshitz-point and Lorentz-violating theories in RD Rm

Abstract

We evaluate a one-loop, two-point, massless Feynman integral ID,m(p,q) relevant for perturbative field theoretic calculations in strongly anisotropic d=D+m dimensional spaces given by the direct sum RD Rm. Our results are valid in the whole convergence region of the integral for generic (non-integer) co-dimensions D and m. We obtain series expansions of ID,m(p,q) in terms of powers of the variable X:=4p2/q4, where p=| p|, q=| q|, p∈ RD, q∈ Rm, and in terms of generalised hypergeometric functions 3F2(-X), when X<1. These are subsequently analytically continued to the complementary region X 1. The asymptotic expansion in inverse powers of X1/2 is derived. The correctness of the results is supported by agreement with previously known special cases and extensive numerical calculations.