The Smallest Faithful Permutation Degree for a Direct Product Obeying an Inequality Condition

Abstract

The minimal faithful permutation degree μ(G) of a finite group G is the least nonnegative integer n such that G embeds in the symmetric group (n). Clearly μ(G × H) μ(G) + μ(H) for all finite groups G and H. Wright (1975) proves that equality occurs when G and H are nilpotent and exhibits an example of strict inequality where G× H embeds in (15). Saunders (2010) produces an infinite family of examples of permutation groups G and H where μ(G × H) < μ(G) + μ(H), including the example of Wright's as a special case. The smallest groups in Saunders' class embed in (10). In this paper we prove that 10 is minimal in the sense that μ(G × H) = μ(G) + μ(H) for all groups G and H such that μ(G× H) 9.