Distinction of the Steinberg representation and the dual group of a symmetric space
Abstract
We study the distinction of the Steinberg representation of a split reductive group G with respect to a split symmetric subgroup H ⊂ G. We relate this distinction problem to a problem about the existence of a non-zero harmonic function on a certain hyper-graph related to X = G/H. We verify the relative local Langlands conjecture for the Steinberg representation by showing that over a p-adic field the Steinberg representation is H-distinguished if and only if its Langlands parameter factors through the dual group of X.
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