Random walk to φ4 and back

Abstract

In this paper we establish an exact relationship between the asymptotic probability distributions 0 and 2 of the multiple point range of the planar random walk and the proper functions [0] and [2] respectively of the planar, complex φ4-theory, setting the number of components m=0: The characteristic functions 0 and 2 of 0 and 2 have simple integral transforms ζ[0] and ζ[2] respectively which turn out to be the extensions of the proper functions [0] and [2] onto a Riemann surface (with infinitely many sheets) in the coupling constant g and are well defined mathematically. ζ[0] and ζ[2] restricted to a specific sheet have a (sectorwise) uniform asymptotic expansion in g=0. The standard perturbation series of [0] and [2] in g have expansion coefficients [0],ptr and [2],ptr which are polynomials in m. Order by order the lowest nontrivial polynomial coefficient in m: [0],ptr,1 = ζ[0]r and [2],ptr,0 = ζ[2]r where ζ[0]r and ζ[2]r are the coefficients of the asymptotic series of ζ[0] and ζ[2] around g=0 respectively. 0 and 2 turn out to be modified Borel type summations of those series. \\ As an application we derive the rising edge behaviour of 0 and 2 from the large order estimates of Lipatov lipatov. It turns out to be of the form of a Gamma distribution with parameters known numerically.