Distinction of the Steinberg representation with respect to a symmetric pair

Abstract

Let K be a non-archimedean local field of residual characteristic p≠ 2. Let G be a connected reductive group over K, let θ be an involution of G over K, and let H be the connected component of θ-fixed subgroup of G over K. By realizing the Steinberg representation of G as the G-space of complex smooth harmonic cochains following the idea of Broussous--Court\`es, we study its space of distinction by H as a finite dimensional complex vector space. We give an upper bound of the dimension, and under certain conditions, we show that the upper bound is sharp by explicitly constructing a basis using the technique of Poincar\'e series. Finally, we apply our general theory to the case where G is a general linear group and H a special orthogonal subgroup, which leads to a complete classification result.

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