Relative Hom-Hopf modules and total integrals

Abstract

Let (H, ) be a monoidal Hom-Hopf algebra and (A, ) a right (H, )-Hom-comodule algebra. We first investigate the criterion for the existence of a total integral of (A, ) in the setting of monoidal Hom-Hopf algebras. Also we prove that there exists a total integral φ: (H, )→ (A, ) if and only if any representation of the pair (H,A) is injective in a functorial way, as a corepresentation of (H, ), which generalizes Doi's result. Finally, we define a total quantum integral : H→ Hom(H, A) and prove the following affineness criterion: if there exists a total quantum integral and the canonical map : ABA→ A H,\ \ aBb -1(a)b[0] (b[1]) is surjective, then the induction functor AB-: H(Mk)B→ H(Mk)HA is an equivalence of categories.