Contents Online
Homology, Homotopy and Applications
Volume 18 (2016)
Number 2
Motion planning in real flag manifolds
Pages: 359 – 375
DOI: https://dx.doi.org/10.4310/HHA.2016.v18.n2.a20
Authors
Abstract
Starting from Borel’s description of the mod-2 cohomology of real flag manifolds, we give a minimal presentation of the cohomology ring of semi-complete flag manifolds $F_{k,m}:=F(1,\ldots,1,m)$, where $1$ is repeated $k$ times. This is used to estimate Farber’s topological complexity of $F_{k,m}$ when $m$ approaches (from below) a 2-power. In particular, we get almost sharp estimates for $F_{2,2^e-1}$ which resemble the known situation for the real projective spaces $F_{1,2^e}$. Our results indicate that the agreement between the topological complexity and the immersion dimension of real projective spaces no longer holds for other flag manifolds. We also get corresponding results for the $s$-th higher topological complexity of these spaces, proving the surprising fact that, as $s$ increases, our cohomological estimates become stronger. Indeed, we get a full description of the higher motion planning problem of some of these manifolds. As a byproduct, we get a complete computation of the higher topological complexity of all closed surfaces (orientable or not).
Keywords
flag manifold, surface, topological complexity, zero-divisors cup-length, motion planning
2010 Mathematics Subject Classification
55M30, 57T15, 68T40, 70B15
Published 29 November 2016