English

Complex-projective and lens product spaces

Algebraic Topology 2013-11-07 v1

Abstract

Let tt be a positive integer. Following work of D. M. Davis, we study the topology of complex-projective product spaces, i.e. quotients of cartesian products of odd dimensional spheres by the diagonal S1S^1-action, and of the tt-torsion lens product spaces, i.e. the corresponding quotients when the action is restricted to the ttht^{\mathrm{th}} roots of unity. For a commutative complex-oriented cohomology theory hh^*, we determine the hh^*-cohomology ring of these spaces (in terms of the tt-series for hh^*, in the case of tt-torsion lens product spaces). When hh^* is singular cohomology with mod 2 coefficients, we also determine the action of the Steenrod algebra. We show that these spaces break apart after a suspension as a wedge of desuspensions of usual stunted complex projective (tt-torsion lens) spaces. We estimate the category and topological complexity of complex-projective and lens product spaces, showing in particular that these invariants are usually much lower than predicted by the usual dimensional bounds. We extend Davis' analysis of manifold properties such as immersion dimension, (stable-)span, and (stable-)parallelizability of real projective product spaces to the complex-projective and lens product cases.

Keywords

Cite

@article{arxiv.1311.1220,
  title  = {Complex-projective and lens product spaces},
  author = {Jesus Gonzalez and Maurilio Velasco},
  journal= {arXiv preprint arXiv:1311.1220},
  year   = {2013}
}

Comments

14 pages. Submitted

R2 v1 2026-06-22T02:01:50.061Z