On a lifting problem of L-packets

Abstract

Let G ⊂eq G be two quasisplit connected reductive groups over a local field of characteristic zero and Gder = Gder. Although the existence of L-packets is still conjectural in general, it is believed that the L-packets of G should be the restriction of that of G. Motivated by this, we hope to construct the L-packets of G from that of G. The primary example in our mind is when G = Sp(2n), whose L-packets have been determined by Arthur (2013), and G = GSp(2n). As a first step, we need to consider some well-known conjectural properties of L-packets. In this paper, we show how they can be deduced from the conjectural endoscopy theory. As an application, we obtain some structural information about L-packets of G from that of G.