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We consider G a semisimple Lie group with finite center and K a maximal compact subgroup of G. We study the regularity of K-finite matrix coefficients of unitary representations of G. More precisely, we find the optimal value (G) such that all such coefficients are (G) -H\"older continuous. The proof relies on analysis of spherical functions of the symmetric Gelfand pair (G, K), using stationary phase estimates from Duistermaat, Kolk and Varadarajan. If U is a compact form of G, then (U, K) is a compact symmetric pair. Using the same tools, we study the regularity of K-finite coefficients of unitary representations of U, improving on previous results obtained by the author.
Guillaume Dumas (Thu,) studied this question.
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