The Explicit Hypergeometric-Modularity Method II

Abstract

In the first paper of this sequence, we provided an explicit hypergeometric modularity method by combining different techniques from the classical, p-adic, and finite field settings. In this article, we explore an application of this method from a motivic viewpoint through some known hypergeometric well-poised formulae of Whipple and McCarthy. We first use the method to derive a class of special weight three modular forms, labeled as K2-functions. Then using well-poised hypergeometric formulae we further construct a class of degree four Galois representations of the absolute Galois groups of the corresponding cyclotomic fields. These representations are then shown to be extendable to GQ and the L-function of each extension coincides with the L-function of an automorphic form.

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