On Gromov’s conjecture for totally non-spin manifolds
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Publication:2828058
DOI10.1142/S1793525316500230zbMath1356.53048arXiv1402.4510OpenAlexW2963195615WikidataQ123285694 ScholiaQ123285694MaRDI QIDQ2828058
Dmitry V. Bolotov, Alexander N. Dranishnikov
Publication date: 24 October 2016
Published in: Journal of Topology and Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1402.4510
fundamental grouppositive scalar curvaturesurgeryclosed manifoldmacroscopic dimensioncohomogonical dimension
Global geometric and topological methods (à la Gromov); differential geometric analysis on metric spaces (53C23) Algebraic topology of manifolds (57N65)
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Cites Work
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- Positive scalar curvature and the Dirac operator on complete Riemannian manifolds
- Positive scalar curvature in dim \(\geq 8\)
- Gromov's macroscopic dimension conjecture
- Filling Riemannian manifolds
- \(C^ *\)-algebras, positive scalar curvature, and the Novikov conjecture. III
- On the structure of manifolds with positive scalar curvature
- A counterexample to the (unstable) Gromov-Lawson-Rosenberg conjecture
- Macroscopic dimension of 3-manifolds
- On Gromov's positive scalar curvature conjecture for duality groups
- On macroscopic dimension of universal coverings of closed manifolds
- On Gromov’s scalar curvature conjecture
- ASYMPTOTIC INVARIANTS OF SMOOTH MANIFOLDS
- Metric structures for Riemannian and non-Riemannian spaces. Transl. from the French by Sean Michael Bates. With appendices by M. Katz, P. Pansu, and S. Semmes. Edited by J. LaFontaine and P. Pansu
