Integrals in left coideal subalgebras and group-like projections

Abstract

We develop a theory of right group-like projections in Hopf algebras linking them with the theory of left coideal subalgebras with two sided counital integrals. Every right group-like projection is associated with a left coideal subalgebra, maximal among the ones containing the given group-like projection as an integral, and we show that that subalgebra is finite dimensional. We observe that in a semisimple Hopf algebra H every left coideal subalgebra has an integral and we prove a 1-1 correspondence between right group-like projections and left coideal subalgebras of H. We provide a number of equivalent conditions for a right group-like projections to be left group-like projection and prove a 1-1 correspondence between semisimple left coideal subalgebras preserved by the squared antipode and two sided group-like projections. We also classify left coideal subalgebras in Taft Hopf algebras Hn2 over a field k, showing that the automorphism group splits them into - a class of cardinality |k|-1 of semisimple ones which correspond to right group-like projections which are not two sided; - finitely many semisimple singletons, each corresponding to two sided group-like projection; the number of those singletons for Hn2 is equal to the number of divisors of n; - finitely many singletons, each non-semisimple and admitting no right group-like projection; the number of those singletons for Hn2 is equal to the number of divisors of n. In particular we answer the question of Landstad and Van Daele showing that there do exist right group-like projections which are not left group-like projections.