The Mathieu group M23 as additive functions on the finite field of size 211

Abstract

We explicitly extend the standard permutation action of the Mathieu group M23 on a 23 element set C=C23 contained in a finite field of 211 elements F211 to additive functions on this finite field. That is we represent M23 as functions :F211 F211 such that (x+y)=(x)+(y) and |C is the standard permutation action. We give explicit 11× 11 matrices for the pair of standard generators of order 23 and order 5, as well as many tables to help facilitate future calculations.