Symmetric periods for automorphic forms on unipotent groups
Abstract
Let k be a number field and A be its ring of adeles. Let U be a unipotent group defined over k, and σ a k-rational involution of U with fixed points U+. As a consequence of the results of C. Moore, the space L2(U(k) UA) is multiplicity free as a representation of UA. Setting p+:φ ∫U+(k) UA+ φ(u)du to be the period integral attached to σ on the space of smooth vectors of L2(U(k) UA), we prove that if is a topologically irreducible subspace of L2(U(k) UA), then p+ is nonvanishing on the subspace ∞ of smooth vectors in if and only if =σ. This is a global analogue of local results due to Y. Benoist and the author, on which the proof relies.
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