中文

The Endomorphism Ring Theorem for Galois and D2 extensions

量子代数 2007-05-23 v2

摘要

Let SS be the left bialgebroid \EndBAB\End {}_BA_B over the centralizer RR of a right D2 algebra extension ABA \| B, which is to say that its tensor-square is isomorphic as AA-BB-bimodules to a direct summand of a finite direct sum of AA with itself. We prove that its left endomorphism algebra is a left SS-Galois extension of AopA^{\rm op}. As a corollary, endomorphism ring theorems for D2 and Galois extensions are derived from the D2 characterization of Galois extension (cf. math.QA/0502188 and math.QA/0409589). We note the converse that a Frobenius extension satisfying a generator condition is D2 if its endomorphism algebra extension is D2.

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引用

@article{arxiv.math/0503194,
  title  = {The Endomorphism Ring Theorem for Galois and D2 extensions},
  author = {Lars Kadison},
  journal= {arXiv preprint arXiv:math/0503194},
  year   = {2007}
}

备注

20 pp, some additional material including a converse endomorphism ring theorem for certain Frobenius extensions, which yields a complete answer to question 1 in math.RA/0107064