Mathematics – Rings and Algebras
Scientific paper
2001-08-09
Mathematics
Rings and Algebras
2 new sections added, 37 pages
Scientific paper
We introduce a general notion of depth two for ring homomorphism N --> M, and derive Morita equivalence of the step one and three centralizers, R = C_M(N) and C = End_{N-M}(M \o_N M), via dual bimodules and step two centralizers A = End_NM_N and B = (M \o_N M)^N, in a Jones tower above N --> M. Lu's bialgebroids End_k A' and A' \o_k {A'}^op over a k-algebra A' are generalized to left and right bialgebroids A and B with B the R-dual bialgebroid of A. We introduce Galois-type actions of A on M and B on End_NM when M_N is a balanced module. In the case of Frobenius extensions M | N, we prove an endomorphism ring theorem for depth two. Further in the case of irreducible extensions, we extend previous results on Hopf algebra and weak Hopf algebra actions in subfactor theory [Szymanski, Nikshych-Vainerman] and its generalizations [Kadison-Nikshych: RA/0107064, RA/0102010] by methods other than nondegenerate pairing. As a result, we have concrete expressions for the Hopf or weak Hopf algebra structures on the step two centralizers. Semisimplicity of B is equivalent to separability of the extension M | N. In the presence of depth two, we show that biseparable extensions are QF.
Kadison Lars
Szlach'anyi Korn'el
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