Holomorphic structures on the quantum projective line
Abstract
We show that much of the structure of the 2-sphere as a complex curve survives the q-deformation and has natural generalizations to the quantum 2-sphere - which, with additional structures, we identify with the quantum projective line. Notably among these is the identification of a quantum homogeneous coordinate ring with the coordinate ring of the quantum plane. In parallel with the fact that positive Hochschild cocycles on the algebra of smooth functions on a compact oriented 2-dimensional manifold encode the information for complex structures on the surface, we formulate a notion of twisted positivity for twisted Hochschild and cyclic cocycles and exhibit an explicit twisted positive Hochschild cocycle for the complex structure on the sphere.
Cite
@article{arxiv.0907.0154,
title = {Holomorphic structures on the quantum projective line},
author = {Masoud Khalkhali and Giovanni Landi and Walter D. van Suijlekom},
journal= {arXiv preprint arXiv:0907.0154},
year = {2012}
}
Comments
22 pages, no figures. Published in IMRN