论文信息 - Classification of virtual string links up to cobordism

Classification of virtual string links up to cobordism

Cobordism of virtual string links on $n$ strands is a combinatorial generalization of link cobordism. There exists a bijection between virtual string links up to cobordisms and elements of the group $\mathbb{Z}^{n(n-1)}$. This paper also shows that virtual string links up to unwelded equivalence are classified by those groups. Finally, the related theory of welded string link cobordism is defined herein and shown to be trivial for string links with one component.

Robin Gaudreau | Robin Gaudreau

[1] N. Habegger,et al. The classification of links up to link-homotopy , 1990 .

[2] Louis H. Kauffman. Virtual Knot Theory , 1999, Eur. J. Comb..

[3] S. Satoh. VIRTUAL KNOT PRESENTATION OF RIBBON TORUS-KNOTS , 2000 .

[4] C. Rourke,et al. The braid-permutation group , 1997 .

[5] Classifying links under fused isotopy , 2006, math/0606198.

[6] Takayoshi Okabayashi,et al. Forvidden moves for virtual links , 2005 .

[7] M. Nagel,et al. Concordance group of virtual knots , 2016, 1606.06404.

[8] V. Bardakov,et al. Unrestricted virtual braids, fused links and other quotients of virtual braid groups , 2015, 1603.01209.

[9] Benjamin Audoux,et al. Homotopy classification of ribbon tubes and welded string links , 2014, 1407.0184.