Universal Mixed Elliptic Motives

Abstract

In this paper we construct a Q-linear tannakian category MEM1 of universal mixed elliptic motives over the moduli space M1,1 of elliptic curves. It contains MTM, the category of mixed Tate motives unramified over the integers. Each object of MEM1 is an object of MTM endowed with an action of SL2(Z) that is compatible with its structure. Universal mixed elliptic motives can be thought of as motivic local systems over M1,1 whose fiber over the tangential base point d/dq at the cusp is a mixed Tate motive. The basic structure of the tannakian fundamental group of MEM is determined and the lowest order terms of all relations are found (using computations of Francis Brown), including the arithmetic relations, which describe the "infinitesimal Galois action". We use the presentation to give a new and more conceptual proof of the Ihara-Takao congruences.