Endoscopic lifts to the Siegel modular threefold related to Klein's cubic threefold

Abstract

Let Alev11 be the moduli space of (1,11)-polarized abelian surfaces with level structure of canonical type. Let be a finite character of order 5 with conductor 11. In this paper we construct five endoscopic lifts i,0 i 4 from two elliptic modular forms fi of weight 2 and gi of weight 4 with complex multiplication by Q(-11) such that i∞ gives a non-holomorphic differential form on Alev11 for each i. Then the spinor L-function is of form L(fi,s-1)L(gi,s) such that L(gi,s) does not appear in the L-function of Alev11 for any i. The existence of such lifts is motivated by the computation of the L-function of Klein's cubic hypersurface which is a birational smooth model of Alev11.