On the generating polynomials for the distribution of generalized binomial coefficients in discrete valuation domains

Abstract

For a discrete valuation domain V with maximal ideal m such that the residue field V/m is finite, there exists a sequence of polynomials (Fn(x))n 0 defined over the quotient field K of V that forms a basis of the V-module Int(V) = \f ∈ K[x] | f(V)⊂eq V\. This sequence of polynomials bears many resemblances to the classical binomial polynomials (xn)n 0. In this paper, we introduce a generating polynomial to account for the distribution of the V-values of the polynomials Fn(x) modulo the maximal ideal m, and prove a result that provides a method for counting exactly how many V-values of the polynomials (Fn(x))n 0 fall into each of the residue classes modulo m. Our main theorem in this paper can be viewed as an analogue of the classical theorem of Garfield and Wilf in the context of discrete valuation domains.