k-partial permutations and the center of the wreath product Sk Sn algebra
Abstract
We generalize the concept of partial permutations of Ivanov and Kerov and introduce k-partial permutations. This allows us to show that the structure coefficients of the center of the wreath product Sk Sn algebra are polynomials in n with non-negative integer coefficients. We use a universal algebra I∞k which projects on the center Z(C[Sk Sn]) for each n. We show that I∞k is isomorphic to the algebra of shifted symmetric functions on many alphabets.
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