Kronecker coefficients via the Giambelli identity for Schur functions

Abstract

One of the central open problems in both algebraic combinatorics and representation theory is to find a positive combinatorial rule for Kronecker coefficients gλ \, μ \, . A notable advance in this direction is due to Blasiak, who proved a combinatorial interpretation in terms of colored Yamanouchi tableaux for the case whereby one of the indexing partitions is hook-shaped. In this paper, we introduce a framework for the evaluation and combinatorial interpretation of Kronecker coefficients, combining a Schur function identity of Littlewood, the Giambelli identity for Schur functions, and Blasiak's combinatorial rule. This framework reduces the study of Kronecker coefficients to alternating sums involving hook-indexed cases. As an application of this framework, we obtain combinatorial interpretations of gt, h(1), h(2) for two-row partitions t and hook-like partitions h(1) and h(2) satisfying natural conditions. More broadly, our approach provides a systematic method for extending hook-based combinatorial rules to wider families of Kronecker coefficients.