arXiv:1703.09440 Abstract | arXiv Analytics

arXiv:1703.09440 [math.GT]Abstract References Reviews Resources

Site-specific Gordian distances of spatial graphs

Published 2017-03-28Version 1

A site-specific Gordian distance between two spatial embeddings of an abstract graph is the minimal number of crossing changes from one to another where each crossing change is performed between two previously specified abstract edges of the graph. It is infinite in some cases. We determine the site-specific Gordian distance between two spatial embeddings of an abstract graph in certain cases. It has an application to puzzle ring problem. The site-specific Gordian distances between Milnor links and trivial links are determined. We use covering space theory for the proofs.

Comments: 14 pages, 17 figures

Categories: math.GT

Subjects: 57M25, 57M15

Keywords: site-specific gordian distance, spatial graphs, spatial embeddings, abstract graph, crossing change

Related articles: Most relevant | Search more

arXiv:math/0106173 [math.GT] (Published 2001-06-20)

Local moves on spatial graphs and finite type invariants

Kouki Taniyama, Akira Yasuhara

arXiv:2301.06933 [math.GT] (Published 2023-01-17)

Splittings of Tangles and Spatial Graphs

Erica Flapan, Hugh Howards

arXiv:1907.03130 [math.GT] (Published 2019-07-06)