### BROWSE

33 53

Cited 0 times in

AN ELEMENTARY PROOF OF THE EFFECT OF 3-MOVE ON THE JONES POLYNOMIAL

DC FieldValueLanguage
dc.contributor.author조서범-
dc.date.accessioned2020-11-11T01:10:35Z-
dc.date.available2020-11-11T01:10:35Z-
dc.date.issued2018-
dc.identifier.urihttps://ir.ymlib.yonsei.ac.kr/handle/22282913/179841-
dc.description.abstractA mathematical knot is an embedded circle in R3. A fundamental problem in knot theory is classifying knots up to its numbers of crossing points. Knots are often distinguished by using a knot invariant, a quantity which is the same for equivalent knots. Knot polynomials are one of well known knot invariants. In 2006, J. Przytycki showed the effects of a n 􀀀 move (a local change in a knot diagram) on several knot polynomials. In this paper, the authors review about knot polynomials, especially Jones polynomial, and give an alternative proof to a part of the Przytychi's result for the case n = 3 on the Jones polynomial.-
dc.description.statementOfResponsibilityopen-
dc.relation.isPartOfPure and Applied Mathematics (한국수학교육학회지시리즈B: 순수 및 응용수학)-
dc.rightsCC BY-NC-ND 2.0 KR-
dc.titleAN ELEMENTARY PROOF OF THE EFFECT OF 3-MOVE ON THE JONES POLYNOMIAL-
dc.typeArticle-
dc.contributor.collegeCollege of Medicine (의과대학)-
dc.contributor.departmentOthers-
dc.identifier.doi10.7468/jksmeb.2018.25.2.95-
dc.contributor.localIdA05959-
dc.subject.keyword2-string tangle-
dc.subject.keyword3-moves-
dc.subject.keywordJones polynomial-
dc.contributor.alternativeNameCho, Seobum-
dc.contributor.affiliatedAuthor조서범-
dc.citation.volume25-
dc.citation.number2-
dc.citation.startPage95-
dc.citation.endPage113-
dc.identifier.bibliographicCitationPure and Applied Mathematics (한국수학교육학회지시리즈B: 순수 및 응용수학), Vol.25(2) : 95-113, 2018-
Appears in Collections:
1. College of Medicine (의과대학) > Others (기타) > 1. Journal Papers