Gyration Stability for Projective Planes
Abstract
Gyrations are operations on manifolds that arise in geometric topology, where a manifold may exhibit distinct gyrations depending on the chosen twisting. For a given , we ask a natural question: do all gyrations of share the same homotopy type regardless of the twisting? A manifold with this property is said to have gyration stability. Inspired by recent work by Duan, which demonstrated that the quaternionic projective plane is not gyration stable with respect to diffeomorphism, we explore this question for projective planes in general. We obtain a complete description of gyration stability for the complex, quaternionic, and octonionic projective planes up to homotopy.
Cite
@article{arxiv.2412.13931,
title = {Gyration Stability for Projective Planes},
author = {Sebastian Chenery and Stephen Theriault},
journal= {arXiv preprint arXiv:2412.13931},
year = {2025}
}
Comments
39 pages, comments welcome. Lightly revised version accepted by Topology and its Applications, with thanks to the anonymous referee