Quantum differential operators on K[x]
Abstract
Following the definition of quantum differential operators given by Lunts and Rosenberg in (Sel. math., New ser. 3 (1997) 335--359), we show that the ring of quantum differential operators on the affine line is the ring generated by x and \del, the familiar differential operators on the line, along with two additional operators which we call \del^\beta^1 and \del^\beta^-1. We describe this ring both as a subring of the ring of graded endomorphisms and as a ring given by generators and relations. From this starting point, we are able to describe the ring of quantum differential operators on affine n-space and to construct the ring of global quantum differential operators on the projective line.
Cite
@article{arxiv.math/0010041,
title = {Quantum differential operators on K[x]},
author = {Uma N. Iyer and Timothy C. McCune},
journal= {arXiv preprint arXiv:math/0010041},
year = {2007}
}
Comments
26 pages, references added. To appear in International Journal of Mathematics