Kronecker coefficients and Harrison centres of the representation ring of the symmetric group

Abstract

We present a computational approach to studying the structure of the representation ring of the symmetric group in dimension six. The Kronecker coefficients and all power formulae of irreducible representations of S6 are computed using the character theory of finite groups. In addition, considering direct sum decomposition of tensor products of different irreducible representations of S6, we characterise generators of the representation ring R(S6), show that its unit group U(R(S6)) is a Klein four-group, and related results on the structure of primitive idempotents. Furthermore, we introduce the Harrison centre theory to study the representation ring and show that the Harrison centre of the cubic form induced by the generating relations of R(S6) is isomorphic to itself. Finally, we conclude with some open problems for future consideration.

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