Relating tensor structures on representations of general linear and symmetric groups
Abstract
For polynomial representations of of a fixed degree, H. Krause defined a new internal tensor product using the language of strict polynomial functors. We show that over an arbitrary commutative base ring , the Schur functor carries this internal tensor product to the usual Kronecker tensor product of symmetric group representations. This is true even at the level of derived categories. The new tensor product is a substantial enrichment of the Kronecker tensor product. E.g. in modular representation theory it brings in homological phenomena not visible on the symmetric group side. We calculate the internal tensor product over any in several interesting cases involving classical functors and the Weyl functors. We show an application to the Kronecker problem in characteristic zero when one partition has two rows or is a hook.
Cite
@article{arxiv.1503.09152,
title = {Relating tensor structures on representations of general linear and symmetric groups},
author = {Upendra Kulkarni and Shraddha Srivastava and K V Subrahmanyam},
journal= {arXiv preprint arXiv:1503.09152},
year = {2016}
}
Comments
Completely re-written manuscript with a new title. Additions include several new results and extension of earlier results. Also develops most of the necessary background in some detail