Topological complexity, asphericity and connected sums
Abstract
We show that if a closed oriented -manifold has a non-trivial cohomology class of even degree , whose all pullbacks to products of type vanish, then the topological complexity is at least , if is odd, and at least or , if is even. These bounds extend and improve a result of Mescher and apply for instance to negatively curved manifolds and to connected sums with at least one such summand. In fact, better bounds are obtained due to the non-vanishing of the Gromov norm. As a consequence, in dimension four, we completely determine the topological complexity of these connected sums, namely we show that it is equal to its maximum value nine. Furthermore, we discuss realisation of degree two homology classes by tori, and show how to construct non-realisable classes out of realisable classes in connected sums. The examples of this paper will quite often be aspherical manifolds whose fundamental groups have trivial center and connected sums. We thus discuss the possible relation between the maximum topological complexity and the triviality of the center for aspherical -manifolds and their connected sums.
Cite
@article{arxiv.2212.08962,
title = {Topological complexity, asphericity and connected sums},
author = {Christoforos Neofytidis},
journal= {arXiv preprint arXiv:2212.08962},
year = {2025}
}
Comments
16 pages; v2: major revision in which stronger statements are proved, erroneous conclusions about the TC of certain connected sums are removed, and the relation between maximal TC and triviality of the center for aspherical manifolds, as well as their connected sums, is discussed