English

On generalized Dold manifolds

Algebraic Topology 2019-06-13 v2

Abstract

Let XX be a smooth manifold with a (smooth) involution σ:XX\sigma:X\to X such that Fix(σ)Fix(\sigma)\ne \emptyset. We call the space P(m,X):=Sm×X/ ⁣P(m,X):=\mathbb{S}^m\times X/\!\sim where (v,x)(v,σ(x))(v,x)\sim (-v,\sigma(x)) a generalized Dold manifold. When XX is an almost complex manifold and the differential Tσ:TXTXT\sigma: TX\to TX is conjugate complex linear on each fibre, we obtain a formula for the Stiefel-Whitney polynomial of P(m,X)P(m,X) when H1(X;Z2)=0H^1(X;\mathbb{Z}_2)=0. We obtain results on stable parallelizability of P(m,X)P(m,X) and a very general criterion for the (non) vanishing of the unoriented cobordism class [P(m,X)][P(m,X)] in terms of the corresponding properties for XX. These results are applied to the case when XX is a complex flag manifold.

Keywords

Cite

@article{arxiv.1708.02418,
  title  = {On generalized Dold manifolds},
  author = {Avijit Nath and Parameswaran Sankaran},
  journal= {arXiv preprint arXiv:1708.02418},
  year   = {2019}
}

Comments

19 pages. A minor error in Prop. 2.5(iii) had been corrected. There was a gap in the proof of Theorem 1.2 which has been corrected. Other minor typos were corrected

R2 v1 2026-06-22T21:09:25.909Z