论文信息 - Introduction to Integral Discriminants

Introduction to Integral Discriminants

The simplest partition function, associated with homogeneous symmetric forms S of degree r in n variables, is integral discriminant J n|r S = e −S in the integrand is substituted by arbitrary function f (S), i.e. integral discriminant is a characteristic of the form S itself, and not of the averaging procedure. The aim of the present paper is to calculate J n|r in a number of non-Gaussian cases. Using Ward identities – linear differential equations, satisfied by integral discriminants – we calculate J 2|3 , J 2|4 , J 2|5 and J 3|3. In all these examples, integral discriminant appears to be a generalized hypergeometric function. It depends on several SL(n) invariants of S, with essential singularities controlled by the ordinary algebraic discriminant of S.

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