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dc.creatorFuter, D
dc.creatorKalfagianni, E
dc.creatorPurcell, J
dc.date.accessioned2021-02-04T20:13:10Z
dc.date.available2021-02-04T20:13:10Z
dc.date.issued2013-01-01
dc.identifier.issn0075-8434
dc.identifier.issn1617-9692
dc.identifier.doihttp://dx.doi.org/10.34944/dspace/5959
dc.identifier.otherBA6UG (isidoc)
dc.identifier.urihttp://hdl.handle.net/20.500.12613/5977
dc.description.abstractThis monograph derives direct and concrete relations between colored Jones polynomials and the topology of incompressible spanning surfaces in knot and link complements. Under mild diagrammatic hypotheses that arise naturally in the study of knot polynomial invariants (A- or B-adequacy), we prove that the growth of the degree of the colored Jones polynomials is a boundary slope of an essential surface in the knot complement. We show that certain coefficients of the polynomial measure how far this surface is from being a fiber in the knot complement; in particular, the surface is a fiber if and only if a particular coefficient vanishes. Our results also yield concrete relations between hyperbolic geometry and colored Jones polynomials: for certain families of links, coefficients of the polynomials determine the hyperbolic volume to within a factor of 4. Our approach is to generalize the checkerboard decompositions of alternating knots. Under mild diagrammatic hypotheses (A- or B-adequacy), we show that the checkerboard knot surfaces are incompressible, and obtain an ideal polyhedral decomposition of their complement. We employ normal surface theory to establish a dictionary between the pieces of the JSJ decomposition of the surface complement and the combinatorial structure of certain spines of the checkerboard surface (state graphs). Since state graphs have previously appeared in the study of Jones polynomials, our setting and methods create a bridge between quantum and geometric knot invariants.
dc.format.extent1-166
dc.relation.haspartLecture Notes in Mathematics
dc.relation.isreferencedbySpringer Berlin Heidelberg
dc.subjectmath.GT
dc.subjectmath.GT
dc.subject57M25, 57M27, 57M50
dc.titleGuts of surfaces and the colored jones polynomial
dc.typeArticle
dc.type.genreJournal Article
dc.relation.doi10.1007/978-3-642-33302-6
dc.ada.noteFor Americans with Disabilities Act (ADA) accommodation, including help with reading this content, please contact scholarshare@temple.edu
dc.date.updated2021-02-04T20:13:07Z
refterms.dateFOA2021-02-04T20:13:11Z


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