Stable conjugacy and epipelagic L-packets for Brylinski-Deligne covers of Sp(2n)

Abstract

Let F be a local field of characteristic not 2. We propose a definition of stable conjugacy for all the covering groups of Sp(2n,F) constructed by Brylinski and Deligne, whose degree we denote by m. To support this notion, we follow Kaletha's approach to construct genuine epipelagic L-packets for such covers in the non-archimedean case with p 2m, or some weaker variant when 4 m; we also prove the stability of packets when F ⊃ Qp with p large. When m=2, the stable conjugacy reduces to that defined by J. Adams, and the epipelagic L-packets coincide with those obtained by -correspondence. This fits within Weissman's formalism of L-groups. For n=1 and m even, it is also compatible with the transfer factors proposed by K. Hiraga and T. Ikeda.