Universal KZB Equations for arbitrary root systems

Abstract

Generalising work of Calaque-Enriquez-Etingof, we construct a universal KZB connection DR for any finite (reduced, crystallographic) root system R. DR is a flat connection on the regular locus of the elliptic configuration space associated to R, with values in a graded Lie algebra tR with a presentation with relations in degrees 2, 3 and 4 which we determine explicitly. The connection DR also extends to a flat connection over the moduli space of pointed elliptic curves. We prove that its monodromy induces an isomorphism between the Malcev Lie algebra of the elliptic pure braid group PR corresponding to R and tR, thus showing that PR is not 1-formal and extending a result of Bezrukavnikov valid in type A. We then study one concrete incarnation of our KZB connection, which is obtained by mapping tR to the rational Cherednik algebra Hh,c of the corresponding Weyl group W. Its monodromy gives rise to an isomorphism between appropriate completions of the double affine Hecke algebra of W and Hh,c.