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Displaying 1 – 20 of 74

$(1, 1)$ -knots via the mapping class group of the twice punctured torus.

Cattabriga, Alessia, Mulazzani, Michele (2004)

Advances in Geometry

1-slim triangles and uniform hyperbolicity for arc graphs and curve graphs

Sebastian Hensel, Piotr Przytycki, Richard C. H. Webb (2015)

Journal of the European Mathematical Society

We describe unicorn paths in the arc graph and show that they form 1-slim triangles and are invariant under taking subpaths. We deduce that all arc graphs are 7-hyperbolic. Considering the same paths in the arc and curve graph, this also shows that all curve graphs are 17-hyperbolic, including closed surfaces.

$3$ -dimensional Euclidean manifolds represented by locally regular coloured graphs

Alba Valverde (1997)

Mathematica Slovaca

3-coloring and other elementary invariants of knots

Józef Przytycki (1998)

Banach Center Publications

3-manifold invariants and periodicity of homology spheres.

Gilmer, Patrick M., Kania-Bartoszynska, Joanna, Przytycki, Józef H. (2002)

Algebraic & Geometric Topology

3-manifold spines and bijoins.

Luigi Grasselli (1990)

Revista Matemática de la Universidad Complutense de Madrid

We describe a combinatorial algorithm for constructing all orientable 3-manifolds with a given standard bidimensional spine by making use of the idea of bijoin (Bandieri and Gagliardi (1982), Graselli (1985)) over a suitable pseudosimplicial triangulation of the spine.

3-manifolds with(out) metrics of nonpositive curvature.

Bernhard Leeb (1995)

Inventiones mathematicae

4--manifolds as covers of the 4--sphere branched over non-singular surfaces.

Iori, Massimiliano, Piergallini, Riccardo (2002)

Geometry & Topology

ℓ²-homology and planar graphs

Timothy A. Schroeder (2013)

Colloquium Mathematicae

In his 1930 paper, Kuratowski proves that a finite graph Γ is planar if and only if it does not contain a subgraph that is homeomorphic to K₅, the complete graph on five vertices, or $K_{3, 3}$ , the complete bipartite graph on six vertices. This result is also attributed to Pontryagin. In this paper we present an ℓ²-homological method for detecting non-planar graphs. More specifically, we view a graph Γ as the nerve of a related Coxeter system and construct the associated Davis complex, $Σ_{Γ}$ . We then use a...

...-reducing Dehn surgeries and 1-bridge knots.

Ying-Qing Wu (1993)

Mathematische Annalen

[unknown]

Thomas Morzadec (0)

Annales de l’institut Fourier

[unknown]

Selim Ghazouani (0)

Annales de l’institut Fourier

$θ$ -curves inducing two different knots with the same $2$ -fold branched covering spaces

Soo Hwan Kim, Yangkok Kim (2003)

Bollettino dell'Unione Matematica Italiana

For a knot $K$ with a strong inversion $i$ induced by an unknotting tunnel, we have a double covering projection $Π : S^{3} \to S^{3} / i$ branched over a trivial knot $Π (fix (i))$ , where $fix (i)$ is the axis of $i$ . Then a set $Π (fix (i) \cup K)$ is called a $θ$ -curve. We construct $θ$ -curves and the $Z_{2} \oplus Z_{2}$ cyclic branched coverings over $θ$ -curves, having two non-isotopic Heegaard decompositions which are one stable equivalent.

Currently displaying 1 – 20 of 74

Page 1 Next

Displaying 1 – 20 of 74

$(1, 1)$ -knots via the mapping class group of the twice punctured torus.

1-slim triangles and uniform hyperbolicity for arc graphs and curve graphs

$3$ -dimensional Euclidean manifolds represented by locally regular coloured graphs

3-coloring and other elementary invariants of knots

3-manifold invariants and periodicity of homology spheres.

3-manifold spines and bijoins.

3-manifolds with(out) metrics of nonpositive curvature.

4--manifolds as covers of the 4--sphere branched over non-singular surfaces.

ℓ²-homology and planar graphs

...-reducing Dehn surgeries and 1-bridge knots.

[unknown]

[unknown]

$θ$ -curves inducing two different knots with the same $2$ -fold branched covering spaces

$Σ$ -chamber systems, coloured graphs and orbifolds.

Алгебраические уравнения с непрерывными коэффициентами и некоторые вопросы алгебраической теории кос

Бесконечные соизмеримые гиперболические группы билипшицево эквиваленты.

Вложение открытых многообразий в компактные.

Геометрическая характеризация свободных конструкций проконечных групп.

Геометрическое разложение пространственных клейновых групп и фундаментальные группы 3-многообразий.

Гиперболические объёмы многообразий Фибоначчи.

Currently displaying 1 – 20 of 74