$q$-deformation with ($\varphi, \Gamma$) structure of the de Rham cohomology of the Legendre family of elliptic curves

TL;DR

This paper constructs a $q$-deformation with $(\

Contribution

It introduces a $q$-analogue of Dwork's results, providing a Frobenius structure on the $q$-de Rham cohomology of the Legendre family of elliptic curves.

Findings

Established a $q$-deformation with $(\varphi, \Gamma)$-structure

Constructed a Frobenius-compatible structure for $q$-hypergeometric equations

Extended Dwork's results to the $q$-deformed setting

Abstract

In the late '60s, B. Dwork studied a Frobenius structure compatible with the classical hypergeometric differential equation with parameters $\left(\frac{1}{2},\frac{1}{2} ; 1 \right)$ by analyzing behavior of solutions of the differential equation under Frobenius transformation. Recently, P. Scholze conjectured the existence of $q$-de Rham cohomology groups for any $\mathbb{Z}$-scheme. In this paper, we give a Frobenius structure compatible with the $q$-hypergeometric differential equation with parameters $(q^{\frac12},q^{\frac12};q)$ by showing a $q$-analogue of some results of Dwork. This construction gives a $q$-deformation with $(\varphi,\Gamma)$-structure over $\mathbb{Z}_p[[q-1]][[\lambda]]$ of the de Rham cohomology of the $p$-adic Legendre family of elliptic curves which has Frobenius structure and connection.