DSpace Collection:https://card-file.onaft.edu.ua/handle/123456789/166762022-03-04T05:15:39Z2022-03-04T05:15:39ZOn the generalization of Inoue manifoldsAndrei Pajitnov, Endo Hisaakihttps://card-file.onaft.edu.ua/handle/123456789/166822021-03-04T13:57:54Z2020-01-01T00:00:00ZTitle: On the generalization of Inoue manifolds
Authors: Andrei Pajitnov, Endo Hisaaki
Abstract: This paper is about a generalization of celebrated Inoue's surfaces. To each matrix M in SL(2n+1,ℤ) we associate a complex non-Kähler manifold TM of complex dimension n+1. This manifold fibers over S1 with the fiber T2n+1 and monodromy MT. Our construction is elementary and does not use algebraic number theory. We show that some of the Oeljeklaus-Toma manifolds are biholomorphic to the manifolds of type TM. We prove that if M is not diagonalizable, then TM does not admit a Kähler structure and is not homeomorphic to any of Oeljeklaus-Toma manifolds.
2020-01-01T00:00:00ZFloer-Novikov cohomology and symplectic fixed points, revisitedKaoru Ono, Hong Van Lehttps://card-file.onaft.edu.ua/handle/123456789/166802021-03-04T13:57:54Z2020-01-01T00:00:00ZTitle: Floer-Novikov cohomology and symplectic fixed points, revisited
Authors: Kaoru Ono, Hong Van Le
Abstract: This note is mostly an exposition of a few versions of Floer-Novikov cohomology with a few new observations. For example, we state a lower bound for the number of symplectic fixed points of a non-degenerate symplectomorphism, which is symplectomorphic isotopic to the identity, on a compact symplectic manifold, more precisely than previous statements in [14,10].2020-01-01T00:00:00ZOlympic links in a Chebotarev linkJun Uekihttps://card-file.onaft.edu.ua/handle/123456789/166812021-03-04T13:57:54Z2020-01-01T00:00:00ZTitle: Olympic links in a Chebotarev link
Authors: Jun Ueki
Abstract: The Chebotarev law for an infinite link is an equidistribution property about how its components are linked in a group theoretic sense. We overview several properties of a Chebotarev link following the author's article "Chebotarev links are stable generic". In addition, we exhibit the density of modulo 2 Olympic links in a Chebotarev link.2020-01-01T00:00:00ZOn Rham cohomology of locally trivial Lie groupoids over triangulated manifoldsJose R. Oliveirahttps://card-file.onaft.edu.ua/handle/123456789/166792021-03-04T13:57:53Z2020-01-01T00:00:00ZTitle: On Rham cohomology of locally trivial Lie groupoids over triangulated manifolds
Authors: Jose R. Oliveira
Abstract: Based on the isomorphism between Lie algebroid cohomology and piecewise smooth cohomology of a transitive Lie algebroid, it is proved that the Rham cohomology of a locally trivial Lie groupoid G on a smooth manifold M is isomorphic to the piecewise Rham cohomology of G, in which G and M are manifolds without boundary and M is smoothly triangulated by a finite simplicial complex K such that, for each simplex ∆ of K, the inverse images of ∆ by the source and target mappings of G are transverses submanifolds in the ambient space G. As a consequence, it is shown that the piecewise de Rham cohomology of G does not depend on the triangulation of the base.2020-01-01T00:00:00Z