English

Notes on quantum weighted projective spaces and multidimensional teardrops

Quantum Algebra 2015-05-20 v2

Abstract

It is shown that the coordinate algebra of the quantum 2n+12n+1-dimensional lens space O(Lq2n+1(i=0nmi;m0,,mn))\mathcal{O}(L^{2n+1}_q(\prod_{i=0}^n m_i; m_0,\ldots, m_n)) is a principal Z\mathbb{Z}-comodule algebra or the coordinate algebra of a circle principal bundle over the weighted quantum projective space WPqn(m0,,mn)\mathbb{WP}^n_q(m_0,\ldots, m_n). Furthermore, the weighted U(1)U(1)-action or the CZ\mathbb{CZ}-coaction on the quantum odd dimensional sphere algebra O(Sq2n+1)\mathcal{O}(S^{2n+1}_q) that defines WPqn(1,m1,,mn)\mathbb{WP}^n_q(1,m_1,\ldots, m_n) is free or principal. Analogous results are proven for quantum real weighted projective spaces RPq2n(m0,,mn)\mathbb{RP}^{2n}_q(m_0,\ldots, m_n). The KK-groups of WPqn(1,,1,m)\mathbb{WP}^n_q(1,\ldots, 1, m) and RPq2n(1,,1,m)\mathbb{RP}^{2n}_q(1,\ldots, 1,m) and the K1K_1-group of Lq2n+1(N;m0,,mn)L^{2n+1}_q(N; m_0,\ldots, m_n) are computed

Keywords

Cite

@article{arxiv.1412.3586,
  title  = {Notes on quantum weighted projective spaces and multidimensional teardrops},
  author = {Tomasz Brzeziński and Simon A. Fairfax},
  journal= {arXiv preprint arXiv:1412.3586},
  year   = {2015}
}

Comments

14 pages; v2 minor revisions

R2 v1 2026-06-22T07:27:34.623Z