Choosing elements from finite fields

Abstract

In two important papers from 1960 Graham Higman introduced the notion of PORC functions, and he proved that for any given positive integer n the number of p-class two groups of order pn is a PORC function of p. A key result in his proof of this theorem is the following: "The number of ways of choosing a finite number of elements from the finite field of order qn subject to a finite number of monomial equations and inequalities between them and their conjugates over GF(q), considered as a function of q, is PORC." Higman's proof of this result involves five pages of homological algebra. Here we give a short elementary proof of the result. Our proof is constructive, and gives an algorithms for computing the relevant PORC functions.