Frobenius extensions and weak Hopf algebras

Abstract

We study a symmetric Markov extension of k-algebras N ∫o M, a certain kind of Frobenius extension with conditional expectation that is tracial on the centralizer and dual bases with a separability property. We place a depth two condition on this extension, which is essentially the requirement that the Jones tower N ∫o M ∫o M1 ∫o M2 can be obtained by taking relative tensor products with centralizers A = CM1(N) and B = CM2(M). Under this condition, we prove that N ∫o M is the invariant subalgebra pair of a weak Hopf algebra action by A, i.e., that N = MA. The endomorphism algebra M1 = N M is shown to be isomorphic to the smash product algebra M # A. We also extend results of Szymanski, Vainerman and the second author, and the authors.

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