Your search keyword '"Kalfagianni, Efstratia"' showing total 188 results

1. Skein modules and character varieties of Seifert manifolds

Author

Detcherry, Renaud, Kalfagianni, Efstratia, and Sikora, Adam S.

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, Mathematics - Representation Theory, 57K31, 57K16

Abstract

We show that the Kauffman bracket skein module of a closed Seifert fibered 3-manifold $M$ is finitely generated over $\mathbb Z[A^{\pm 1}]$ if and only if $M$ is irreducible and non-Haken. We analyze in detail the character varieties $X(M)$ of such manifolds and show that under mild conditions they are reduced. We compute the Kauffman bracket skein modules for these $3$-manifolds (over $\mathbb Q(A)$) and show that their dimensions coincide with $|X(M)|.$, Comment: 28 pages

Published

2024

2. Crossing numbers of cable knots

Author

Kalfagianni, Efstratia and Mcconkey, Rob

Subjects

Mathematics - Geometric Topology, 57K10, 57K14, 57K16

Abstract

We use the degree of the colored Jones knot polynomials to show that the crossing number of a $(p,q)$-cable of an adequate knot with crossing number $c$ is larger than $q^2\, c$. As an application we determine the crossing number of $2$-cables of adequate knots. We also determine the crossing number of the connected sum of any adequate knot with a $2$-cable of an adequate knot., Comment: 11 pages, 5 Figures. To appear in The Bulletin of London Math Society. arXiv admin note: text overlap with arXiv:2108.12391

Published

2023

3. Kauffman bracket skein modules of small 3-manifolds

Author

Detcherry, Renaud, Kalfagianni, Efstratia, and Sikora, Adam S.

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, Mathematics - Representation Theory, 57K31, 57K16

Abstract

The proof of Witten's finiteness conjecture established that the Kauffman bracket skein modules of closed $3$-manifolds are finitely generated over $\mathbb Q(A)$. In this paper, we develop a novel method for computing these skein modules. We show that if the skein module $S(M,\mathbb Q[A^{\pm 1}])$ of $M$ is tame (e.g. finitely generated over $\mathbb Q[A^{\pm 1}]$), and the $SL(2,\mathbb C)$-character variety is reduced, then the dimension $\dim_{\mathbb Q(A)}\, S(M, \mathbb Q(A))$ is the number of closed points in this character variety. This, in particular, verifies a conjecture of Gunningham, Jordan, and Safronov, that relates the dimension $\dim_{\mathbb Q(A)}\, S(M, \mathbb Q(A))$ to the Abouzaid-Manolescu $SL(2,\mathbb C)$-Floer theoretic invariants, for large families of 3-manifolds. We also prove a criterion for reduceness of character varieties of closed $3$-manifolds and use it to compute the skein modules of Dehn fillings of $(2,2n+1)$-torus knots and of the figure-eight knot. The later family gives the first instance of computations of skein modules for closed hyperbolic 3-manifolds. We also prove that the skein modules of rational homology spheres have dimension at least $1$ over $\mathbb Q(A)$., Comment: 41 pages, 1 figure

Published

2023

4. Constructions of $q$-hyperbolic knots

Author

Kalfagianni, Efstratia and Melby, Joseph M.

Subjects

Mathematics - Geometric Topology, 57K31, 57M50, 57K16

Abstract

We use Dehn surgery methods to construct infinite families of hyperbolic knots in the 3-sphere satisfying a weak form of the Turaev--Viro invariants volume conjecture. The results have applications to a conjecture of Andersen, Masbaum, and Ueno about quantum representations of surface mapping class groups. We obtain an explicit family of pseudo-Anosov mapping classes acting on surfaces of any genus and with one boundary component that satisfy the conjecture., Comment: 24 pages, 12 figures, 4 tables, accepted in Annales l'Institut Fourier

Published

2023

5. Volumes of fibered 2-fold branched covers of 3-manifolds

Author

Hirose, Susumu, Kalfagianni, Efstratia, and Kin, Eiko

Subjects

Mathematics - Geometric Topology

Abstract

We prove that for any closed, connected, oriented 3-manifold M, there exists an infinite family of 2-fold branched covers of M that are hyperbolic 3-manifolds and surface bundles over the circle with arbitrarily large volume., Comment: 16 pages, 4 figures, to appear in Journal of Topology and Analysis

Published

2022

6. Pants complex, TQFT and hyperbolic geometry

Author

Detcherry, Renaud and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology

Abstract

We introduce a coarse perspective on relations of the $SU(2)$-Witten-Reshetikhin-Turaev TQFT, the Weil-Petersson geometry of the Teichm\"uller space, and volumes of hyperbolic 3-manifolds. Using data from the asymptotic expansions of the curve operators in the skein theoretic version of the $SU(2)$-TQFT, we define the quantum intersection number between pants decompositions of a closed surface. We show that the quantum intersection number admits two sided bounds in terms of the geometric intersection number and we use it to obtain a metric on the pants graph of surfaces. Using work of Brock we show that the pants graph equipped with this metric is quasi-isometric to the Teichm\"uller space with the Weil-Petersson metric and that the translation length of our metric provides two sided linear bounds on the volume of hyperbolic fibered manifolds. We briefly discuss how these relations are interpeted from the view point of $SU(2)$-character varieties of 3-manifolds. We also obtain a characterization of pseudo-Anosov mapping classes in terms of asymptotics of the quantum intersection number under iteration in the mapping class group and relate these asymptotics with stretch factors. We also discuss how these results fit with a conjecture of Andersen, Masbaum and Ueno about quantum representations of mapping class groups., Comment: 41 pages, 6 Figures. Expository revisions following referee reports. To appear in American Journal of Mathematics

Published

2021

7. Jones diameter and crossing number of knots

Author

Kalfagianni, Efstratia and Lee, Christine Ruey Shan

Subjects

Mathematics - Geometric Topology, 57K10, 57K14, 57K16

Abstract

It has long been known that the quadratic term in the degree of the colored Jones polynomial of a knot is bounded above in terms of the crossing number of the knot. We show that this bound is sharp if and only if the knot is adequate. As an application of our result we determine the crossing numbers of broad families of non-adequate prime satellite knots. More specifically, we exhibit minimal crossing number diagrams for untwisted Whitehead doubles of zero-writhe adequate knots. This allows us to determine the crossing number of untwisted Whitehead doubles of any amphicheiral adequate knot, including, for instance, the Whitehead doubles of the connected sum of any alternating knot with its mirror image. We also determine the crossing number of the connected sum of any adequate knot with an untwisted Whitehead double of a zero-writhe adequate knot., Comment: Minor revisions following referee suggestions. Accepted for publication in Advances in Mathematics

Published

2021

8. Guts, volume and Skein Modules of 3-manifolds

Author

Bavier, Brandon and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, 57K10, 57K14, 57K31, 57K32

Abstract

We consider hyperbolic links that admit alternating projections on surfaces in compact, irreducible 3-manifolds. We show that, under some mild hypotheses, the volume of the complement of such a link is bounded below in terms of a Kauffman bracket function defined on link diagrams on the surface. In the case that the 3-manifold is a thickened surface, this Kauffman bracket function leads to a Jones-type polynomial that is an isotopy invariant of links. We show that coefficients of this polynomial provide 2-sided linear bounds on the volume of hyperbolic alternating links in the thickened surface. As a corollary of the proof of this result, we deduce that the twist number of a reduced, twist reduced, checkerboard alternating link projection with disk regions, is an invariant of the link., Comment: 24 pages, 6 figures; To be published in Fundamenta Mathematicae; V2: Corrected typos, updated references

Published

2020

9. Alternating links on surfaces and volume bounds

Author

Kalfagianni, Efstratia and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

Weakly generalised alternating knots are knots with an alternating projection onto a closed surface in a compact irreducible 3-manifold, and they share many hyperbolic geometric properties with usual alternating knots. For example, usual alternating knots have volume bounded above and below by the twist number of the alternating diagram due to Lackenby. Howie and Purcell showed that a similar lower bound holds for weakly generalised alternating knots. In this paper, we show that a generalisation of the upper volume bound does not hold, by producing a family of weakly generalised alternating knots in the 3-sphere with fixed twist number but unbounded volumes. As a corollary, generalised alternating knots can have arbitrarily small cusp density, in contrast with usual alternating knots whose cusp densities are bounded away from zero due to Lackenby and Purcell. On the other hand, we show that the twist number of a weakly generalised alternating projection does gives two sided linear bounds on volume inside a thickened surface; we state some related open questions., Comment: 24 pages, 7 figures. V2 exposition expanded. Accepted into Communications in Analysis and Geometry

Published

2020

10. Remarks on Jones slopes and surfaces of knots

Author

Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra

Abstract

We point out that the strong slope conjecture implies that the degrees of the colored Jones knot polynomials detect the figure eight knot. Furthermore, we propose a characterization of alternating knots in terms of the Jones period and the degree span of the colored Jones polynomial., Comment: Minor edits. Accepted in Acta Math. Vietnamica (Proc. of the conference "Quantum Topology and Hyperbolic Geometry", Da Nang, Vietnam, May 27-31, 2019)

Published

2020

11. Cosets of monodromies and quantum representations

Author

Detcherry, Renaud and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, 57M50, 57R17, 17B37, 57R56

Abstract

We use geometric methods to show that given any $3$-manifold $M$, and $g$ a sufficiently large integer, the mapping class group $\mathrm{Mod}(\Sigma_{g,1})$ contains a coset of an abelian subgroup of rank $\lfloor \frac{g}{2}\rfloor,$ consisting of pseudo-Anosov monodromies of open-book decompositions in $M.$ We prove a similar result for rank two free cosets of $\mathrm{Mod}(\Sigma_{g,1}).$ These results have applications to a conjecture of Andersen, Masbaum and Ueno about quantum representations of surface mapping class groups. For surfaces with boundary, and large enough genus, we construct cosets of abelian and free subgroups of their mapping class groups consisting of elements that satisfy the conjecture. The mapping tori of these elements are fibered 3-manifolds that satisfy a weak form of the Turaev-Viro invariants volume conjecture., Comment: Minor revisions following referee suggestions. To appear in Indiana University Mathematics Journal

Published

2020

12. Jones diameter and crossing number of knots

Author

Kalfagianni, Efstratia and Lee, Christine Ruey Shan

Published

2023

13. The Strong Slope Conjecture and torus knots

Author

Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, 57M25

Abstract

We observe that the strong slope conjecture implies that the degree of the colored Jones polynomial detects all torus knots. As an application we obtain that an adequate knot that has the same colored Jones polynomial degrees as a torus knot must be a $(2,q)$-torus knot., Comment: Minor revisions, Journal of the Math. Soc. of Japan, to appear

Published

2018

14. Growth of quantum 6j-symbols and applications to the Volume Conjecture

Author

Belletti, Giulio, Detcherry, Renaud, Kalfagianni, Efstratia, and Yang, Tian

Subjects

Mathematics - Geometric Topology, Mathematical Physics, Mathematics - Quantum Algebra

Abstract

We prove the Turaev-Viro invariants volume conjecture for a "universal" class of cusped hyperbolic 3-manifolds that produces all 3-manifolds with empty or toroidal boundary by Dehn filling. This leads to two-sided bounds on the volume of any hyperbolic 3-manifold with empty or toroidal boundary in terms of the growth rate of the Turaev-Viro invariants of the complement of an appropriate link contained in the manifold. We also provide evidence for a conjecture of Andersen, Masbaum and Ueno (AMU conjecture) about certain quantum representations of surface mapping class groups. A key step in our proofs is finding a sharp upper bound on the growth rate of the quantum $6j-$symbol evaluated at $q=e^{\frac{2\pi i}{r}}.$, Comment: 29 pages, 3 figures, to appear in Journal of Differential Geometry

Published

2018

15. State Surfaces of Links

Author

Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, 57M25, 57M27

Abstract

State surfaces are spanning surfaces of links that are obtained from link diagrams guided by the combinatorics underlying Kauffman's construction of the Jones polynomial via state models. Geometric properties of such surfaces are often dictated by simple link diagrammatic criteria, and the surfaces themselves carry important information about geometric structures of link complements. State surfaces also provide a tool for studying relations between Jones polynomials and topological invariants, such as the crosscap number or invariants coming from geometric structures on link complements (e.g. hyperbolic volume). This article is brief survey on some of the recent applications of state surfaces., Comment: Invited Contribution to "Knot Encyclopedia"

Published

2018

16. Quantum representations and monodromies of fibered links

Author

Detcherry, Renaud and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, 57M25

Abstract

Andersen, Masbaum and Ueno conjectured that certain quantum representations of surface mapping class groups should send pseudo-Anosov mapping classes to elements of infinite order (for large enough level $r$). In this paper, we relate the AMU conjecture to a question about the growth of the Turaev-Viro invariants $TV_r$ of hyperbolic 3-manifolds. We show that if the $r$-growth of $|TV_r(M)|$ for a hyperbolic 3-manifold $M$ that fibers over the circle is exponential, then the monodromy of the fibration of $M$ satisfies the AMU conjecture. Building on earlier work \cite{DK} we give broad constructions of (oriented) hyperbolic fibered links, of arbitrarily high genus, whose $SO(3)$-Turaev-Viro invariants have exponential $r$-growth. As a result, for any $g>n\geqslant 2$, we obtain infinite families of non-conjugate pseudo-Anosov mapping classes, acting on surfaces of genus $g$ and $n$ boundary components, that satisfy the AMU conjecture. We also discuss integrality properties of the traces of quantum representations and we answer a question of Chen and Yang about Turaev-Viro invariants of torus links., Comment: Updated references, Added Remark 5.8. To appear in Advances in Mathematics

Published

2017

17. A survey of hyperbolic knot theory

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

We survey some tools and techniques for determining geometric properties of a link complement from a link diagram. In particular, we survey the tools used to estimate geometric invariants in terms of basic diagrammatic link invariants. We focus on determining when a link is hyperbolic, estimating its volume, and bounding its cusp shape and cusp area. We give sample applications and state some open questions and conjectures., Comment: 20 pages, 5 figures

Published

2017

18. Gromov norm and Turaev-Viro invariants of 3-manifolds

Author

Detcherry, Renaud and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, 57M25 (Primary) 57M50, 57N10 (Secondary)

Abstract

We establish a relation between the "large r" asymptotics of the Turaev-Viro invariants $TV_r$ and the Gromov norm of 3-manifolds. We show that for any orientable, compact 3-manifold $M$, with (possibly empty) toroidal boundary, $\log |TV_r (M)|$ is bounded above by a function linear in $r$ and whose slope is a positive universal constant times the Gromov norm of $M$. The proof combines TQFT techniques, geometric decomposition theory of 3-manifolds and analytical estimates of $6j$-symbols. We obtain topological criteria that can be used to check whether the growth is actually exponential; that is one has $\log| TV_r (M)|\geqslant B \ r$, for some $B>0$. We use these criteria to construct infinite families of hyperbolic 3-manifolds whose $SO(3)$ Turaev-Viro invariants grow exponentially. These constructions are essential for the results of [DK:AMU] where the authors make progress on a conjecture of Andersen, Masbaum and Ueno about the geometric properties of surface mapping class groups detected by the quantum representations. We also study the behavior of the Turaev-Viro invariants under cutting and gluing of 3-manifolds along tori. In particular, we show that, like the Gromov norm, the values of the invariants do not increase under Dehn filling and we give applications of this result on the question of the extent to which relations between the invariants $TV_r$ and hyperbolic volume are preserved under Dehn filling. Finally we give constructions of 3-manifolds, both with zero and non-zero Gromov norm, for which the Turaev-Viro invariants determine the Gromov norm., Comment: 28 pages, no figures: Miinor revisions. Ann. Sci. Ecole Norm. Sup., to appear

Published

2017

19. Normal and Jones surfaces of knots

Author

Kalfagianni, Efstratia and Lee, Christine Ruey Shan

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, 57M25, 57N10

Abstract

We describe a normal surface algorithm that decides whether a knot, with known degree of the colored Jones polynomial, satisfies the Strong Slope Conjecture. We also discuss possible simplifications of our algorithm and state related open questions. We establish a relation between the Jones period of a knot and the number of sheets of the surfaces that satisfy the Strong Slope Conjecture (Jones surfaces). We also present numerical and experimental evidence supporting a stronger such relation which we state as an open question., Comment: 15 pages, 1 Figures and 1 Table. J. of knot Theory and Ramifications, to appear

Published

2017

20. Turaev-Viro invariants, colored Jones polynomials and volume

Author

Detcherry, Renaud, Kalfagianni, Efstratia, and Yang, Tian

Subjects

Mathematics - Geometric Topology, Mathematical Physics, Mathematics - Differential Geometry, Mathematics - Quantum Algebra, 57M27, 57M25, 57M50, 57R56

Abstract

We obtain a formula for the Turaev-Viro invariants of a link complement in terms of values of the colored Jones polynomial of the link. As an application we give the first examples for which the volume conjecture of Chen and the third named author\,\cite{Chen-Yang} is verified. Namely, we show that the asymptotics of the Turaev-Viro invariants of the Figure-eight knot and the Borromean rings complement determine the corresponding hyperbolic volumes. Our calculations also exhibit new phenomena of asymptotic behavior of values of the colored Jones polynomials that seem not to be predicted by neither the Kashaev-Murakami-Murakami volume conjecture and various of its generalizations nor by Zagier's quantum modularity conjecture. We conjecture that the asymptotics of the Turaev-Viro invariants of any link complement determine the simplicial volume of the link, and verify it for all knots with zero simplicial volume. Finally we observe that our simplicial volume conjecture is stable under connect sum and split unions of links., Comment: 27 pages, 1 figure, to appear in Quantum Topology

Published

2017

21. Crossing numbers of cable knots.

Author

Kalfagianni, Efstratia and Mcconkey, Rob

Abstract

We use the degree of the colored Jones knot polynomials to show that the crossing number of a (p,q)$(p,q)$‐cable of an adequate knot with crossing number c$c$ is larger than q2c$q^2\, c$. As an application, we determine the crossing number of 2‐cables of adequate knots. We also determine the crossing number of the connected sum of any adequate knot with a 2‐cable of an adequate knot. [ABSTRACT FROM AUTHOR]

Published

2024

22. Geometric estimates from spanning surfaces

Author

Burton, Stephan D. and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology

Abstract

We derive bounds on the length of the meridian and the cusp volume of hyperbolic knots in terms of the topology of essential surfaces spanned by the knot. We provide an algorithmically checkable criterion that guarantees that the meridian length of a hyperbolic knot is below a given bound. As applications we find knot diagrammatic upper bounds on the meridian length and the cusp volume of hyperbolic adequate knots and we obtain new large families of knots with meridian lengths bounded above by four. We also discuss applications of our results to Dehn surgery., Comment: 18 pages; 4 Figures; To appear in the Bulletin of London Math. Society

Published

2016

23. A Jones slopes characterization of adequate knots

Author

Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology

Abstract

We establish a characterization of adequate knots in terms of the degree of their colored Jones polynomial. We show that, assuming the Strong Slope conjecture, our characterization can be reformulated in terms of "Jones slopes" of knots and the essential surfaces that realize the slopes .For alternating knots the reformulated characterization follows by recent work of J. Greene and J. Howie., Comment: 14 Pages, 3 Figures: This version, incorporating referee suggestions, is accepted in Indiana University Mathematics Journal

Published

2016

24. Remarks on Jones Slopes and Surfaces of Knots

Author

Kalfagianni, Efstratia

Published

2021

25. Knot Cabling and the Degree of the Colored Jones Polynomial II

Author

Kalfagianni, Efstratia and Tran, Anh T.

Subjects

Mathematics - Geometric Topology, Primary 57N10. Secondary 57M25

Abstract

We continue our study of the degree of the colored Jones polynomial under knot cabling started in "Knot Cabling and the Degree of the Colored Jones Polynomial" (arXiv:1501.01574). Under certain hypothesis on this degree, we determine how the Jones slopes and the linear term behave under cabling. As an application we verify Garoufalidis' Slope Conjecture and a conjecture of the authors for cables of a two-parameter family of closed 3-braids called 2-fusion knots., Comment: 14 pages

Published

2015

26. Knot Cabling and the Degree of the Colored Jones Polynomial

Author

Kalfagianni, Efstratia and Tran, Anh T.

Subjects

Mathematics - Geometric Topology, 57N10, 5725

Abstract

We study the behavior of the degree of the colored Jones polynomial and the boundary slopes of knots under the operation of cabling. We show that, under certain hypothesis on this degree, if a knot $K$ satisfies the Slope Conjecture then a $(p, q)$-cable of $K$ satisfies the conjecture, provided that $p/q$ is not a Jones slope of $K$. As an application we prove the Slope Conjecture for iterated cables of adequate knots and for iterated torus knots. Furthermore we show that, for these knots, the degree of the colored Jones polynomial also determines the topology of a surface that satisfies the Slope Conjecture. We also state a conjecture suggesting a topological interpretation of the linear terms of the degree of the colored Jones polynomial (Conjecture \ref{conj}), and we prove it for the following classes of knots:iterated torus knots and iterated cables of adequate knots, iterated cables of several non-alternating knots with up to nine crossings, pretzel knots of type $(-2, 3, p)$ and their cables, and two-fusion knots., Comment: 31pages. Modified to also include the results of arXiv:1501.04614. This version will appear in the New York Journal of Mathematics

Published

2015

27. A Survey of Hyperbolic Knot Theory

Author

Futer, David, Kalfagianni, Efstratia, Purcell, Jessica S., Adams, Colin C., editor, Gordon, Cameron McA., editor, Jones, Vaughan F.R., editor, Kauffman, Louis H., editor, Lambropoulou, Sofia, editor, Millett, Kenneth C., editor, Przytycki, Jozef H., editor, Ricca, Renzo, editor, and Sazdanovic, Radmila, editor

Published

2019

28. Crosscap numbers and the Jones polynomial

Author

Kalfagianni, Efstratia and Lee, Christine Ruey Shan

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

We give sharp two-sided linear bounds of the crosscap number (non-orientable genus) of alternating links in terms of their Jones polynomial. Our estimates are often exact and we use them to calculate the crosscap numbers for several infinite families of alternating links and for several alternating knots with up to twelve crossings. We also discuss generalizations of our results for classes of non-alternating links., Comment: 27 pages. Minor corrections and modifications. To appear in Advances of Mathematics

Published

2014

29. Knots without cosmetic crossings

Author

Balm, Cheryl Jaeger and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

Let K' be a knot that admits no cosmetic crossing changes and let C be a non-trivial, prime, non-cable knot. Then any knot that is a satellite of C with winding number zero and pattern K' admits no cosmetic crossing changes. As a consequence we prove the nugatory crossing conjecture for Whitehead doubles of prime, non-cable knots., Comment: To appear in Topology and Its Applications. arXiv admin note: substantial text overlap with arXiv:1301.6369

Published

2014

30. On the degree of the colored Jones polynomial

Author

Kalfagianni, Efstratia and Lee, Christine Ruey Shan

Subjects

Mathematics - Geometric Topology

Abstract

The extreme degrees of the colored Jones polynomial of any link are bounded in terms of concrete data from any link diagram. It is known that these bounds are sharp for semi-adequate diagrams. One of the goals of this paper is to show the converse; if the bounds are sharp then the diagram is semi-adequate. As a result, we use colored Jones link polynomials to extract an invariant that detects semi-adequate links and discuss some applications., Comment: To appear in Acta Math. Vietnamica (Proceedings of Hyperbolic Geometry and Quantum Topology in Nha Trang)

Published

2013

31. Hyperbolic semi-adequate links

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

We provide a diagrammatic criterion for semi-adequate links to be hyperbolic. We also give a conjectural description of the satellite structures of semi-adequate links. One application of our result is that the closures of sufficiently complicated positive braids are hyperbolic links., Comment: 25 pages, 9 figures

Published

2013

32. Cosmetic crossings of twisted knots

Author

Balm, Cheryl and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology

Abstract

We prove that the property of admitting no cosmetic crossing changes is preserved under the operation of forming certain satellites of winding number zero. We also define strongly cosmetic crossing changes and we discuss their behavior under the operation of inserting full twists in the strings of closed braids., Comment: 13 pages, Extensive revision --prepared for journal submission

Published

2013

33. Quantum representations and monodromies of fibered links

Author

Detcherry, Renaud and Kalfagianni, Efstratia

Published

2019

34. Quasifuchsian state surfaces

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

This paper continues our study, initiated in [arXiv:1108.3370], of essential state surfaces in link complements that satisfy a mild diagrammatic hypothesis (homogeneously adequate). For hyperbolic links, we show that the geometric type of these surfaces in the Thurston trichotomy is completely determined by a simple graph--theoretic criterion in terms of a certain spine of the surfaces. For links with A- or B-adequate diagrams, the geometric type of the surface is also completely determined by a coefficient of the colored Jones polynomial of the link., Comment: 21 pages, 9 figures: To appear in the Transactions of the AMS

Published

2012

35. Jones polynomials, volume, and essential knot surfaces: a survey

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

This paper is a brief overview of recent results by the authors relating colored Jones polynomials to geometric topology. The proofs of these results appear in the papers [arXiv:1002.0256] and [arXiv:1108.3370], while this survey focuses on the main ideas and examples., Comment: 27 pages, 23 figures. v2 contains minor revisions and updated references. To appear in Proceedings of Knots in Poland III

Published

2011

36. Guts of surfaces and the colored Jones polynomial

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

This 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., Comment: 179 pages, 62 figures (mostly in color). Printing in color is highly recommended. v4 contains minor revisions and corrections. A version of this monograph will appear in the Lecture Notes in Mathematics series (Springer)

Published

2011

37. Cosmetic crossings and Seifert matrices

Author

Balm, Cheryl, Friedl, Stefan, Kalfagianni, Efstratia, and Powell, Mark

Subjects

Mathematics - Geometric Topology, 57M25, 57M27

Abstract

We study cosmetic crossings in knots of genus one and obtain obstructions to such crossings in terms of knot invariants determined by Seifert matrices. In particular, we prove that for genus one knots the Alexander polynomial and the homology of the double cover branching over the knot provide obstructions to cosmetic crossings. As an application we prove the nugatory crossing conjecture for twisted Whitehead doubles of non-cable knots. We also verify the conjecture for several families of pretzel knots and all genus one knots with up to 12 crossings., Comment: 16 pages, 5 Figures. Minor revisions. This version will appear in Communications in Analysis and Geometry. This paper subsumes the results of arXiv:1107.2034

Published

2011

38. Cosmetic crossings of genus one knots

Author

Balm, Cheryl and Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology

Abstract

We show that for genus one knots the Alexander polynomial and the homology of the double cover branching over the knot provide obstructions to cosmetic crossings. As an application we prove the nugatory crossing conjecture for the negatively twisted, positive Whitehead doubles of all knots. We also verify the conjecture for several families of pretzel knots and all genus one knots with up to 10 crossings., Comment: 9 pages, 5 Figures

Published

2011

39. Slopes and colored Jones polynomials of adequate knots

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27

Abstract

Garoufalidis conjectured a relation between the boundary slopes of a knot and its colored Jones polynomials. According to the conjecture, certain boundary slopes are detected by the sequence of degrees of the colored Jones polynomials. We verify this conjecture for adequate knots, a class that vastly generalizes that of alternating knots., Comment: 7 pages, 3 figures. To appear in Proceedings of the AMS

Published

2010

40. An intrinsic approach to invariants of framed links in 3-manifolds

Author

Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra

Abstract

We study framed links in irreducible 3-manifolds that are $Z$-homology 3-spheres or atoroidal $Q$-homology 3-spheres. We calculate the dual of the Kauffman skein module over the ring of two variable power series with complex coefficients. For links in $S^3$ we give a new construction of the classical Kauffman polynomial.

Published

2009

41. On diagrammatic bounds of knot volumes and spectral invariants

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M50

Abstract

In recent years, several families of hyperbolic knots have been shown to have both volume and $\lambda_1$ (first eigenvalue of the Laplacian) bounded in terms of the twist number of a diagram, while other families of knots have volume bounded by a generalized twist number. We show that for general knots, neither the twist number nor the generalized twist number of a diagram can provide two-sided bounds on either the volume or $\lambda_1$. We do so by studying the geometry of a family of hyperbolic knots that we call double coil knots, and finding two-sided bounds in terms of the knot diagrams on both the volume and on $\lambda_1$. We also extend a result of Lackenby to show that a collection of double coil knot complements forms an expanding family iff their volume is bounded., Comment: 16 pages, 7 figures

Published

2009

42. Cusp areas of Farey manifolds and applications to knot theory

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

This paper gives the first explicit, two-sided estimates on the cusp area of once-punctured torus bundles, 4-punctured sphere bundles, and 2-bridge link complements. The input for these estimates is purely combinatorial data coming from the Farey tesselation of the hyperbolic plane. The bounds on cusp area lead to explicit bounds on the volume of Dehn fillings of these manifolds, for example sharp bounds on volumes of hyperbolic closed 3-braids in terms of the Schreier normal form of the associated braid word. Finally, these results are applied to derive relations between the Jones polynomial and the volume of hyperbolic knots, and to disprove a related conjecture., Comment: 44 pages, 11 figures. Version 4 contains revisions and corrections (most notably, in Sections 5 and 6) that incorporate referee comments. To appear in the International Mathematics Research Notices.

Published

2008

43. Symmetric links and Conway sums: volume and Jones polynomial

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, 57M25, 57M27, 57M50

Abstract

We obtain bounds on hyperbolic volume for periodic links and Conway sums of alternating tangles. For links that are Conway sums we also bound the hyperbolic volume in terms of the coefficients of the Jones polynomial., Comment: 18 pages, 7 figures. Revised according to referee's comments. To appear in Mathematical Research Letters.

Published

2008

44. A Jones Slopes Characterization of Adequate Knots

Author

Kalfagianni, Efstratia

Published

2018

45. A note on quantum 3-manifold invariants and hyperbolic volume

Author

Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, 57M25, 57N10

Abstract

We investigate the conjectural relations between the Reshetikhin-Turaev-Witten quantum SU(2) invariants and the volume of hyperbolic 3-manifolds. Given a finite set of sufficiently large positive integers, say J, we construct examples of closed hyperbolic 3-manifolds with the same invariants at all levels in J and different volume., Comment: 8 pages, 1 figure: Added "Concluding Remarks" and additional references. Final version; to appear in the Journal of Knot Theory and its Ramifications

Published

2007

46. Seifert surfaces, Commutators and Vassiliev invariants

Author

Kalfagianni, Efstratia and Lin, Xiao-Song

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, 57M25, 57N10

Abstract

We show that the Vassiliev invariants of a knot K, are obstructions to finding a regular Seifert surface, S, whose complement looks "simple" (e.g. like the complement of a disc) to the lower central series of its fundamental group., Comment: 35 pages, 13 Figures. To appear in the J. of Knot Theory and its Ramifications (special volume in honor of L. Kauffman)

Published

2007

47. Dehn filling, volume, and the Jones polynomial

Author

Futer, David, Kalfagianni, Efstratia, and Purcell, Jessica S.

Subjects

Mathematics - Geometric Topology, Mathematics - Differential Geometry, 57M25, 57M50

Abstract

Given a hyperbolic 3-manifold with torus boundary, we bound the change in volume under a Dehn filling where all slopes have length at least 2\pi. This result is applied to give explicit diagrammatic bounds on the volumes of many knots and links, as well as their Dehn fillings and branched covers. Finally, we use this result to bound the volumes of knots in terms of the coefficients of their Jones polynomials., Comment: This version contains corrections to Section 4. Published in Journal of Differential Geometry

Published

2006

48. Alternating sum formulae for the determinant and other link invariants

Author

Dasbach, Oliver T., Futer, David, Kalfagianni, Efstratia, Lin, Xiao-Song, and Stoltzfus, Neal W.

Subjects

Mathematics - Geometric Topology, Mathematics - Combinatorics, 57M25, 57M27

Abstract

A classical result states that the determinant of an alternating link is equal to the number of spanning trees in a checkerboard graph of an alternating connected projection of the link. We generalize this result to show that the determinant is the alternating sum of the number of quasi-trees of genus j of the dessin of a non-alternating link. Furthermore, we obtain formulas for other link invariants by counting quantities on dessins. In particular we will show that the $j$-th coefficient of the Jones polynomial is given by sub-dessins of genus less or equal to $j$., Comment: 18 pages, 8 figures; extended version

Published

2006

49. Cosmetic crossing changes of fibered knots

Author

Kalfagianni, Efstratia

Subjects

Mathematics - Geometric Topology

Abstract

We prove the nugatory crossing conjecture for fibered knots. We also show that if a knot $K$ is $n$-adjacent to a fibered knot $K'$, for some $n>1$, then either the genus of $K$ is larger than that of $K'$ or $K$ is isotopic to $K'$., Comment: Completely rewritten and shortened. To appear in J. Reine Angew. Math.(Crelle's Journal)

Published

2006

50. The Jones polynomial and graphs on surfaces

Author

Dasbach, Oliver T., Futer, David, Kalfagianni, Efstratia, Lin, Xiao-Song, and Stoltzfus, Neal W.

Subjects

Mathematics - Geometric Topology, Mathematics - Combinatorics, 57M25

Abstract

The Jones polynomial of an alternating link is a certain specialization of the Tutte polynomial of the (planar) checkerboard graph associated to an alternating projection of the link. The Bollobas-Riordan-Tutte polynomial generalizes the Tutte polynomial of planar graphs to graphs that are embedded in closed oriented surfaces of higher genus. In this paper we show that the Jones polynomial of any link can be obtained from the Bollobas-Riordan-Tutte polynomial of a certain oriented ribbon graph associated to a link projection. We give some applications of this approach., Comment: 19 pages, 9 figures, minor changes

Published

2006