H-Equivariant Morita equivalences of Loewy-graded comodule algebras

Abstract

Let H be a coradically graded Hopf algebra. For every Loewy-graded exact H-comodule algebra A=n≥ 0 A(n) and H0-equivariant Morita equivalence A(0)H0 X, there exists a Loewy-graded H-comodule algebra B (isomorphic to X in degree zero) realizing an H-equivariant Morita equivalence AH B. In addition, if every exact H0-comodule algebra is H0-equivariant Morita equivalent to a coideal subalgebra of H0, then every Loewy-graded exact H-comodule algebra is H-equivariant Morita equivalent to a coideal subalgebra of H. We also discuss Loewy-graded H-comodule algebras with H0=KP, the Kac-Paljutkin Hopf algebra.

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