Bimodule Structure of Central Simple Algebras
Abstract
For a maximal separable subfield K of a central simple algebra A, we provide a semiring isomorphism between K-K-bimodules A and H-H bisets of G = (L/F), where F = Z(A), L is the Galois closure of K/F, and H = (L/K). This leads to a combinatorial interpretation of the growth of K((KaK)i), for fixed a ∈ A, especially in terms of Kummer sets.
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