On the spherical partition algebra

Abstract

For k ∈ N we introduce an idempotent subalgebra, the spherical partition algebra SP k, of the partition algebra P k, that we define using an embedding associated with the trivial representation of the symmetric group Sk. We determine a basis for SP k and this provides a combinatorial interpretation of the dimension of SPk, involving bipartite partitions of k. For t ∈ C we consider the specialized algebra SPk(t). For t = n ∈ N, we describe the structure of SPk(n) by giving the permutation module decomposition of the k'th symmetric power of the defining module for the symmetric group algebra C Sn . In general, we show that SPk(t) is quasi-hereditary over C for all t ∈ C, except t=0. We determine the decomposition numbers for SPk(t) for every specialization t ∈ C except t= 0 , (which includes semisimple and non-semisimple cases). In particular we determine the structure of all indecomposable projective modules, and the indecomposable tilting modules.