Two properties of symmetric cube transfers of modular forms

Abstract

In this article, we study two important properties of sym3 transfers of the automorphic representation π associated to a modular form. First we compute the conductor of sym3(π). Then we detect the types of local automorphic representations at bad primes by the variation of the epsilon factors of symmetric cube transfer of the representation π attached to a cusp form f. Here we twist the modular forms by a specific quadratic character. From this variation number, for each prime p, we classify all possible types of symmetric cube transfers of the local representations πp. For sym3 transfer, the most difficult prime is p=3.