English

The Taylor-Wiles method for reductive groups

Number Theory 2026-03-04 v4

Abstract

We construct a local deformation problem for residual Galois representations ρˉ\bar{\rho} valued in an arbitrary reductive group G^\hat{G} which we use to develop a variant of the Taylor-Wiles method. Our generalization allows Taylor-Wiles places for which the image of Frobenius is semisimple, a weakening of the regular semisimple constraint imposed previously in the literature. We introduce the notion of G^\hat{G}-adequate subgroup, our corresponding 'big image' condition. When G^\hat{G} is a simply connected simple group of type C\mathrm{C} or of exceptional type and G^GLn\hat{G} \to \mathrm{GL}_n is a faithful irreducible representation of minimal dimension, we show that a subgroup is G^\hat{G}-adequate if it is GLn\mathrm{GL}_n-irreducible and the residue characteristic is sufficiently large. We apply our ideas to the case G^=GSp4\hat{G} = \mathrm{GSp}_4 and prove a modularity lifting theorem for abelian surfaces over a totally real field FF which holds under weaker hypotheses than in the work of Boxer-Calegari-Gee-Pilloni. We deduce some modularity results for elliptic curves over quadratic extensions of FF.

Keywords

Cite

@article{arxiv.2205.05062,
  title  = {The Taylor-Wiles method for reductive groups},
  author = {Dmitri Whitmore},
  journal= {arXiv preprint arXiv:2205.05062},
  year   = {2026}
}

Comments

Accepted version

R2 v1 2026-06-24T11:13:27.826Z