English

Rank-two Milnor idempotents for the multipullback quantum complex projective plane

K-Theory and Homology 2026-04-21 v4 Operator Algebras

Abstract

The K0K_0-group of the C*-algebra of multipullback quantum complex projective plane is known to be Z3\mathbb{Z}^3, with one generator given by the C*-algebra itself, one given by the section module of the noncommutative (dual) tautological line bundle, and one given by the Milnor module associated to a generator of the K1K_1-group of the C*-algebra of Calow-Matthes quantum 3-sphere. Herein we prove that these Milnor modules are isomorphic either to the section module of a noncommutative vector bundle associated to the SUq(2)SU_q(2)-prolongation of the Heegaard quantum 5-sphere SH5S^5_H viewed as a U(1)U(1)-quantum principal bundle, or to a complement of this module in the rank-four free module. Finally, we demonstrate that one of the above Milnor modules always splits into the direct sum of the rank-one free module and a rank-one non-free projective module that is \emph{not} associated with SH5S^5_H.

Keywords

Cite

@article{arxiv.1708.04426,
  title  = {Rank-two Milnor idempotents for the multipullback quantum complex projective plane},
  author = {Carla Farsi and Piotr M. Hajac and Tomasz Maszczyk and Bartosz Zielinski},
  journal= {arXiv preprint arXiv:1708.04426},
  year   = {2026}
}

Comments

This paper has been superseded by arXiv:2512.08304, which is not just an update, or a new version. It contains new research obtain by different authors

R2 v1 2026-06-22T21:14:55.330Z