The structure group for quasi-linear equations via universal enveloping algebras

Abstract

We consider the approach of replacing trees by multi-indices as an index set of the abstract model space T introduced by Otto, Sauer, Smith and Weber to tackle quasi-linear singular SPDEs. We show that this approach is consistent with the postulates of regularity structures when it comes to the structure group G. In particular, G⊂ Aut(T) arises from a Hopf algebra T+ and a comodule T→ T+T. In fact, this approach, where the dual T* of the abstract model space T naturally embeds into a formal power series algebra, allows to interpret G*⊂ Aut(T*) as a Lie group arising from a Lie algebra L ⊂ End(T*) consisting of derivations on this power series algebra. These derivations in turn are the infinitesimal generators of two actions on the space of pairs (nonlinearities, functions of space-time mod constants). These actions are shift of space-time and tilt by space-time polynomials. The Hopf algebra T+ arises from a coordinate representation of the universal enveloping algebra U(L) of the Lie algebra L. The coordinates are determined by an underlying pre-Lie algebra structure of the derived algebra of L. Strong finiteness properties, which are enforced by gradedness and the restrictive definition of T, allow for this purely algebraic construction of G. We also argue that there exist pre-Lie algebra and Hopf algebra morphisms between our structure and the tree-based one in the cases of branched rough paths (Grossman-Larson, Connes-Kreimer) and of the generalized parabolic Anderson model.