Explicit images for the Shimura Correspondence

Abstract

In 2014, Yang showed that for F ∈ Ar, s, 1, 1N, we have Shr(F V24) = G 12 where G∈ Snewr+2s - 1(0(6), - ( 8r ), - ( 12r )), where Shr is the r-th Shimura lift associated to the theta-multiplier. He proved a similar result for (r,6) = 3.\:His proofs rely on trace computations in integral and half-integral weights. In this paper, we provide a constructive proof of Yang's result. We obtain explicit formulas for Sr(F), the r-th Shimura lift associated to the eta-multiplier defined by Ahlgren, Andersen, and Dicks, when 1≤ r≤ 23 is odd and N = 1. We also obtain formulas for lifts of Hecke eigenforms multiplied by theta-function eta-quotients and lifts of Rankin-Cohen brackets of Hecke eigenforms with theta-function eta-quotients.