Pointed Hopf algebra (co)actions on rational functions

Abstract

This article studies the construction of Hopf algebras H acting on a given algebra K in terms of algebra morphisms σ K → Mn(K). The approach is particularly suited for controlling whether these actions restrict to a given subalgebra B of K, whether H is pointed, and whether these actions are compatible with a given *-structure on K. The theory is applied to the field K=k(t) of rational functions containing the coordinate ring B=k[t2,t3] of the cusp. An explicit example is described in detail and shown to define a quantum homogeneous space structure on the cusp, which, unlike the previously known one, extends from regular to rational functions.