Explicit Hilbert-Kunz functions of 2 x 2 determinantal rings

Abstract

Let k[X] = k[xi,j: i = 1,..., m; j = 1,..., n] be the polynomial ring in m n variables xi,j over a field k of arbitrary characteristic. Denote by I2(X) the ideal generated by the 2 × 2 minors of the generic m × n matrix [xi,j]. We give a closed formulation for the dimensions of the k-vector space k[X]/(I2(X) + (x1,1q,..., xm,nq)) as q varies over all positive integers, i.e., we give a closed form for the generalized Hilbert-Kunz function of the determinantal ring k[X]/I2[X]. We also give a closed formulation of dimensions of related quotients of k[X]/I2[X]. In the process we establish a formula for the numbers of some compositions (ordered partitions of integers), and we give a proof of a new binomial identity.