A short proof of Hironaka's Theorem on freeness of some Hecke modules
Abstract
Let E/F be an unramified extension of non-archimedean local fields of residual characteristic different than 2. We provide a simple geometric proof of a variation of a result of Y. Hironaka. Namely we prove that the module S(X)K0 is free over the Hecke algebra H(SLn(E),SLn(OE)), where X is the space of unimodular Hermitian forms on En and OE is the ring of integers in E.
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