Families of Galois representations and $(\varphi, τ)$-modules

Abstract: Let $p$ be a prime, and let $K$ be a finite extension of $\mathbf{Q}p$, with absolute Galois group $\cal{G}_K$. Let $\pi$ be a uniformizer of $K$ and let $K\infty$ be the Kummer extension obtained by adjoining to $K$ a system of compatible $p^n$-th roots of $\pi$, for all $n$, and let $L$ be the Galois closure of $K_\infty$. Using these extensions, Caruso has constructed \'etale $(\varphi,\tau)$-modules, which classify $p$-adic Galois representations of $K$. In this paper, we use locally analytic vectors and theories of families of $\varphi$-modules over Robba rings to prove the overconvergence of $(\varphi,\tau)$-modules in families. As examples, we also compute some explicit families of $(\varphi,\tau)$-modules in some simple cases.