Relating homomorphism spaces between Specht modules of different degrees

Abstract

Let K be an infinite field of characteristic p>0 and let λ, μ be partitions of n, where λ=(λ1,...,λn) and μ=(μ1,..,μn). By Sλ we denote the Specht module corresponding to λ for the group algebra KSn of the symmetric group Sn. D. Hemmer has raised the question of relating the homomorphism spaces Sn(Sμ, Sλ) and Sn'(Sμ+, Sλ+), where n'=n+kpd, λ+ =λ+(kpd), μ+=μ+(kpd), and d, k are positive integers. We show that these are isomorphic if p is odd, pd >\λ2, μ1-λ1\ and μ2 λ1.