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We provide an example, which shows that studying homological and homotopical properties of cobordisms between arbitrary, that is not necessarily negative, graph manifolds is not enough to prove the $\mu$-constant conjecture of Le Dung Trang…

Algebraic Geometry · Mathematics 2013-04-05 Maciej Borodzik , Stefan Friedl

A $d$-dimensional body-and-hinge framework is a structure consisting of rigid bodies connected by hinges in $d$-dimensional space. The generic infinitesimal rigidity of a body-and-hinge framework has been characterized in terms of the…

Combinatorics · Mathematics 2009-07-13 Naoki Katoh , Shin-ichi Tanigawa

A torus manifold is an even-dimensional manifold acted on by a half-dimensional torus with non-empty fixed point set and some additional orientation data. It may be considered as a far-reaching generalisation of toric manifolds from…

Algebraic Topology · Mathematics 2007-05-23 Mikiya Masuda , Taras Panov

An old conjecture in non-K\"ahler geometry states that, if a compact Hermitian manifold has constant holomorphic sectional curvature, then the metric must be K\"ahler (when the constant is non-zero) or Chern flat (when the constant is…

Differential Geometry · Mathematics 2025-10-01 Shuwen Chen , Fangyang Zheng

In this short note we prove the Borel conjecture for a family of aspherical manifolds that includes higher graph manifolds.

Geometric Topology · Mathematics 2019-12-05 Noé Bárcenas , Daniel Juan-Pineda , Pablo Suárez-Serrato

In this article we study the Arnold conjecture in settings where objects under consideration are no longer smooth but only continuous. The example of a Hamiltonian homeomorphism, on any closed symplectic manifold of dimension greater than…

Symplectic Geometry · Mathematics 2020-11-18 Lev Buhovsky , Vincent Humilière , Sobhan Seyfaddini

We give several criteria to decide whether a given tensor category is the abelian envelope of a fixed symmetric monoidal category. As a main result we prove that the category of finite-dimensional representations of a semisimple simply…

Representation Theory · Mathematics 2022-12-21 Kevin Coulembier , Inna Entova-Aizenbud , Thorsten Heidersdorf

A classical theorem of Alexandroff states that every $n$-dimensional compactum $X$ contains an $n$-dimensional Cantor manifold. This theorem has a number of generalizations obtained by various authors. We consider extension-dimensional and…

General Topology · Mathematics 2008-07-25 A. Karassev , P. Krupski , V. Todorov , V. Valov

In this paper, we solve affirmatively B.-Y. Chen's conjecture for hypersurfaces in the Euclidean space, under a generic condition. More precisely, every biharmonic hypersurface of the Euclidean space must be minimal if their principal…

Differential Geometry · Mathematics 2014-08-26 N. Koiso , H. Urakawa

Topological classification of the 4-manifolds bridges computation theory and physics. A proof of the undecidability of the homeomorphy problem for 4-manifolds is outlined here in a clarifying way. It is shown that an arbitrary Turing…

General Relativity and Quantum Cosmology · Physics 2007-05-23 James R. van Meter

We show that every topological n-manifold M admits a locally flat closed embedding $\iota\colon M \hookrightarrow \mathbb{R}^{2n+1}$ and is a retract of some neighbourhood $U \subseteq \mathbb{R}^{2n+1}$

Geometric Topology · Mathematics 2022-05-12 Raphael Floris

We introduce a direct generalization of the Weinstein conjecture to closed, Lichnerowicz exact, locally conformally symplectic manifolds, (for short $\lcs$ manifolds). This conjectures existence of certain 2-curves in the manifold, which we…

Symplectic Geometry · Mathematics 2023-10-16 Yasha Savelyev

We study biharmonic hypersurfaces and biharmonic submanifolds in a Riemannian manifold. One of interesting problems in this direction is Chen's conjecture which says that any biharmonic submanifold in a Euclidean space is minimal. From the…

Differential Geometry · Mathematics 2021-10-07 Keomkyo Seo , Gabjin Yun

An $r$-uniform hypergraph ($r$-graph for short) is called linear if every pair of vertices belong to at most one edge. A linear $r$-graph is complete if every pair of vertices are in exactly one edge. The famous Brown-Erd\H{o}s-S\'os…

Combinatorics · Mathematics 2021-09-17 Asaf Shapira , Mykhaylo Tyomkyn

We show P\'eter Csorba's conjecture that the graph homomorphism complex Hom(C_5,K_{n+2}) is homeomorphic to a Stiefel manifold, the space of unit tangent vectors to the n-dimensional sphere. For this a general tool is developed that allows…

Combinatorics · Mathematics 2007-05-23 Carsten Schultz

Consider a connected homogeneous Riemannian manifold $(M,ds^2)$ and a Riemannian covering $(M,ds^2) \to \Gamma \backslash (M,ds^2)$. If $\Gamma \backslash (M,ds^2)$ is homogeneous then every $\gamma \in \Gamma$ is an isometry of constant…

Differential Geometry · Mathematics 2023-03-30 Joseph A. Wolf

In the paper we present results about generalized Berwald surfaces involving the intrinsic characterization, some topological obstructions for the base manifold and examples.

Differential Geometry · Mathematics 2018-08-22 Cs. Vincze , T. Khoshdani , S. Mehdi Zadeh , M. Oláh

We establish the Hodge conjecture for the top dimensional cohomology group with integer coefficients of any $q$-complete complex manifold $X$ with $q<\dim X$. This holds in particular for the complement $X=\mathbb{C}\mathbb{P}^n\setminus A$…

Algebraic Geometry · Mathematics 2016-03-09 Franc Forstneric , Jaka Smrekar , Alexandre Sukhov

We describe interrelations between a topology structure of closed manifolds (orientable and non-orientable) of the dimension $n\geq 4$ and the structure of the non-wandering set of regular homeomorphisms, in particular, Morse-Smale…

Dynamical Systems · Mathematics 2024-08-06 Elena Gurevich , Ilya Saraev

We investigate a question of Cooper adjacent to the Virtual Haken Conjecture. Assuming certain conjectures in number theory, we show that there exist hyperbolic rational homology 3-spheres with arbitrarily large injectivity radius. These…

Geometric Topology · Mathematics 2009-09-29 Frank Calegari , Nathan M Dunfield