Cusp forms for exceptional group of type E7
Abstract
Let G be the connected reductive group of type E7,3 over Q and T be the corresponding symmetric domain in C27. Let =G(Z) be the arithmetic subgroup defined by Baily. In this paper, for any positive integer k 10, we will construct a (non-zero) holomorphic cusp form on T of weight 2k with respect to from a Hecke cusp form in S2k-8(SL2(Z)). This lift is an analogue of Ikeda's construction.
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