Geodesic
Positive curvature and rational ellipticity
Amann, Manuel1 ; Kennard, Lee2
1Fakultät für Mathematik, Institut für Algebra und Geometrie, Karlsruher Institut für Technologie, Englerstraße 2, D-76131 Karlsruhe, Germany
2Department of Mathematics, University of Oklahoma, Norman, OK 73019, USA
Algebraic and Geometric Topology, Tome 15 (2015) no. 4, pp. 2269-2301
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Simply connected manifolds of positive sectional curvature are speculated to have a rigid topological structure. In particular, they are conjectured to be rationally elliptic, ie to have only finitely many non-zero rational homotopy groups. In this article, we combine positive curvature with rational ellipticity to obtain several topological properties of the underlying manifold. These results include an upper bound on the Euler characteristic and new evidence for a couple of well-known conjectures due to Hopf and Halperin. We also prove a conjecture of Wilhelm for even-dimensional manifolds whose rational type is one of the known examples of positive curvature.

DOI : 10.2140/agt.2015.15.2269
Classification : 53C20, 57N65, 55P62
Keywords: positive curvature, rational ellipticity, torus symmetry, Euler characteristic, Wilhelm conjecture, Halperin conjecture, Hopf conjecture

Amann, Manuel  1   ; Kennard, Lee  2

1 Fakultät für Mathematik, Institut für Algebra und Geometrie, Karlsruher Institut für Technologie, Englerstraße 2, D-76131 Karlsruhe, Germany
2 Department of Mathematics, University of Oklahoma, Norman, OK 73019, USA 
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Amann, Manuel; Kennard, Lee. Positive curvature and rational ellipticity. Algebraic and Geometric Topology, Tome 15 (2015) no. 4, pp. 2269-2301. doi: 10.2140/agt.2015.15.2269

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