Separable Functors and Formal Smoothness

The natural problem we approach in the present paper is to show how the notion of formally smooth (co)algebra inside monoidal categories can substitute that of (co)separable (co)algebra in the study of splitting bialgebra homomorphisms. This is performed investigating the relation between formal smoothness and separability of certain functors and led to other results related to Hopf algebra theory. Between them we prove that the existence of $ad$-(co)invariant integrals for a Hopf algebra $H$ is equivalent to the separability of some forgetful functors. In the finite dimensional case, this is also equivalent to the separability of the Drinfeld Double $D(H)$ over $H$. Hopf algebras which are formally smooth as (co)algebras are characterized. We prove that given a bialgebra surjection $\pi :E\to H$ with nilpotent kernel such that $H$ is a Hopf algebra which is formally smooth as a $K$-algebra, then $\pi$ has a section which is a right $H$-colinear algebra homomorphism. Moreover, if $H$ is also endowed with an $ad$-invariant integral, then this section can be chosen to be $H$-bicolinear. We also deal with the dual case.