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dc.contributor.advisorDavis, Christopher
dc.contributor.authorGallagher, Ryan
dc.contributor.authorOlerich, Ethan
dc.date.accessioned2024-03-01T17:44:11Z
dc.date.available2024-03-01T17:44:11Z
dc.date.issued2022-04
dc.identifier.urihttp://digital.library.wisc.edu/1793/85017
dc.descriptionColor poster with text and diagrams.en_US
dc.description.abstractIn an important work, Cimasoni and Florens introduced the notion of a colored link (literally a link whose components have been grouped together by colors). These allow one to define new link invariants by treating components of a single color like they are a single component. In this project, we consider the so-called triple linking number. This invariant can be defined in terms of the intersections of a collections of surfaces bounded by that link. Our new invariant can be used to prove that certain colored links are not boundary links – meaning that any surfaces bounded by their colored sublinks must intersect each other.en_US
dc.description.sponsorshipUniversity of Wisconsin--Eau Claire Office of Research and Sponsored Programsen_US
dc.language.isoen_USen_US
dc.relation.ispartofseriesUSGZE AS589;
dc.subjectKnot theoryen_US
dc.subjectMathematics - Geometric Topologyen_US
dc.subjectPostersen_US
dc.subjectDepartment of Mathematicsen_US
dc.titleColored Triple Linking Numberen_US
dc.typePresentationen_US


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