Please use this identifier to cite or link to this item:
https://libeldoc.bsuir.by/handle/123456789/10532
Title: | New Approach to the Generalized
Poincare Conjecture |
Authors: | Ermolitski, A. A. |
Keywords: | публикации ученых;Riemannian Metric;Homotopy-Equivalence;Compact Smooth Manifolds;Smooth Triangulation |
Issue Date: | 2013 |
Citation: | Ermolitski, A. A. New Approach to the Generalized Poincare Conjecture / A. A. Ermolitski // Applied Mathematics. - 2013. - № 4. - P. 1361 - 1365. |
Abstract: | Using our proof of the Poincare conjecture in dimension three and the method of mathematical induction a short and
transparent proof of the generalized Poincare conjecture (the main theorem below) has been obtained. Main Theorem.
Let Mn be a n-dimensional, connected, simply connected, compact, closed, smooth manifold and there exists a smooth
finite triangulation on Mn which is coordinated with the smoothness structure of Mn. If Sn is the n-dimensional sphere
then the manifolds Mn and Sn are homemorphic. |
URI: | https://libeldoc.bsuir.by/handle/123456789/10532 |
Appears in Collections: | Публикации в зарубежных изданиях
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