Complexity $c$ Pairs in Simple Algebraic Groups
Abstract
We call a pair of closed subgroups from a connected reductive algebraic group a {\it complexity pair} if the multiplication action of the pair on is of complexity . The main focus of this article is on the cases where is simple and is either 0 or 1. After showing that both of the subgroups and cannot be reductive subgroups unless , we look for the cases where exactly one of the subgroups and is reductive. It turns out that there are only a few such pairs, and their classification involves the horospherical homogeneous spaces of small ranks. As a byproduct of the circle of ideas that we use for this development, we obtain the classification of the diagonal spherical actions of simple algebraic groups on the products of flag varieties with affine homogeneous spaces.
Cite
@article{arxiv.1703.05076,
title = {Complexity $c$ Pairs in Simple Algebraic Groups},
author = {Mahir Bilen Can},
journal= {arXiv preprint arXiv:1703.05076},
year = {2018}
}
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