Wall-crossing and p-adic Artin formalism for GSp4 × GL2 × GL2
Abstract
The goal of this article is to develop a p-adic Artin formalism in the context of p-adic families of automorphic forms on GSp4 × GL2 × GL2. Our treatment is guided by the (double) wall-crossing principle, emphasising an interplay between arithmetic GGP and p-adic explicit GGP formulae. Although the picture we present remains largely conjectural, we provide evidence in favour of our conjectures (a) in terms of algebraic p-adic L-functions, and (b) in endoscopic scenarios.
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