Algebra depth in tensor categories
Abstract
Study of the quotient module of a finite-dimensional Hopf subalgebra pair in order to compute its depth yields a relative Maschke Theorem, in which semisimple extension is characterized as being separable, and is therefore an ordinary Frobenius extension. We study the core Hopf ideal of a Hopf subalgebra, noting that the length of the annihilator chain of tensor powers of the quotient module is linearly related to the depth, if the Hopf algebra is semisimple. A tensor categorical definition of depth is introduced, and a summary from this new point of view of previous results are included. It is shown in a last section that the depth, Bratteli diagram and relative cyclic homology of algebra extensions are Morita invariants.
Cite
@article{arxiv.1511.02349,
title = {Algebra depth in tensor categories},
author = {Lars Kadison},
journal= {arXiv preprint arXiv:1511.02349},
year = {2015}
}
Comments
27 pp, dedication, additional acknowledgements, and grammatical corrections