A Combinatorial Identity for the p-Binomial Coefficient Based on Abelian Groups

Abstract

For non-negative integers k≤ n, we prove a combinatorial identity for the p-binomial coefficient nkp based on abelian p-groups. A purely combinatorial proof of this identity is not known. While proving this identity, for r∈ N\0\,s∈ N and p a prime, we present a purely combinatorial formula for the number of subgroups of Zs of finite index pr with quotient isomorphic to the finite abelian p-group of type λ, which is a partition of r into at most s parts. This purely combinatorial formula is similar to that for the enumeration of subgroups of a certain type in a finite abelian p-group obtained by Lynne Marie Butler. As consequences, this combinatorial formula gives rise to many enumeration formulae that involve polynomials in p with non-negative integer coefficients.