On the computation of base-change lifts and lifts of Hida families

TL;DR

This paper provides an explicit formula for Hecke eigenvalues of base-change Hilbert modular forms, demonstrates the factorization of their L-functions, and proves the liftability of Hida families to base-change forms.

Contribution

It introduces a new explicit formula for Hecke eigenvalues and establishes the lift of Hida families to base-change forms over totally real Galois fields.

Findings

Explicit formula for Hecke eigenvalues of base-change lifts

Factorization of L-functions for base-change forms

Existence proof for base-change lifts of Hida families

Abstract

We derive an explicit formula for the Hecke eigenvalues of a Hilbert modular form which is a base-change lift of a classical newform to a totally real Galois number field. We show that for a totally real abelian number field $F$ the $L$-function of a base-change lifted form can be factorized as a product of twisted $L$-functions over the characters of $F$. Moreover, we use the formula for the Hecke eigenvalues of a base-change lift to prove the existence of a base-change lift of a Hida family. In particular, we show that a Hida family of classical Hecke eigenforms can be lifted to a formal power series that specializes to the base-change lifts of the Hida family of classical cusp forms.