Unobstructedness of Galois deformation rings associated to RACSDC automorphic representations

Abstract: Let $F$ be a CM field and let $(\overline{r}{\pi,\lambda}){\lambda}$ be the compatible system of residual $\mathcal{G}n$-valued representations of $\operatorname{Gal}{F}$ attached to a RACSDC automorphic representation $\pi$ of $\operatorname{GL}n(\mathbb{A})$, as studied by Clozel, Harris and Taylor and others. Under mild assumptions, we prove that the fixed-determinant universal deformation rings attached to $\overline{r}{\pi,\lambda}$ are unobstructed for all places $\lambda$ in a subset of Dirichlet density $1$, continuing the investigations of Mazur, Weston and Gamzon. During the proof, we develop a general framework for proving unobstructedness (which could be useful for other applications in future) and an $R=T$-theorem, relating the universal crystalline deformation ring of $\overline{r}_{\pi,\lambda}$ and a certain unitary fixed-type Hecke algebra.