Your search keyword '"Knot (mathematics)"' showing total 581 results

1. Lagrangian Cobordisms and Legendrian Invariants in Knot Floer Homology

Author

John A. Baldwin, Tye Lidman, and C.-M. Michael Wong

Subjects

Pure mathematics, General Mathematics, 010102 general mathematics, Structure (category theory), Geometric Topology (math.GT), Mathematics::Algebraic Topology, Mathematics::Geometric Topology, 01 natural sciences, Mathematics - Geometric Topology, symbols.namesake, Symplectization, Floer homology, Mathematics - Symplectic Geometry, Mathematics::K-Theory and Homology, 0103 physical sciences, FOS: Mathematics, 57R17 (Primary) 57R58, 57R90 (Secondary), symbols, Symplectic Geometry (math.SG), 010307 mathematical physics, 0101 mathematics, Mathematics::Symplectic Geometry, Lagrangian, Mathematics, Knot (mathematics)

Abstract

We prove that the LOSS and GRID invariants of Legendrian links in knot Floer homology behave in certain functorial ways with respect to decomposable Lagrangian cobordisms in the symplectization of the standard contact structure on $\mathbb{R}^3$. Our results give new, computable, and effective obstructions to the existence of such cobordisms., Comment: 28 pages, 16 figures, 1 table

Published

2022

2. Endomorphism Semigroups of Some Class of Connected Unars with Stagnant Element

Author

S. V. Syrovatskaya

Subjects

Pure mathematics, Endomorphism, Mathematics::Operator Algebras, General Mathematics, 010102 general mathematics, 0103 physical sciences, 0101 mathematics, Mathematics::Representation Theory, 01 natural sciences, 010305 fluids & plasmas, Knot (mathematics), Mathematics

Abstract

The class $$\mathfrak{K}$$ of all connected unars with stagnant element being their single knot element is considered. Structure of the endomorphism semigroups of unars from $$\mathfrak{K}$$ is described.

Published

2020

3. GENERATORS, RELATIONS, AND HOMOLOGY FOR OZSVÁTH–SZABÓ’S KAUFFMAN-STATES ALGEBRAS

Author

Marco Marengon, Andrew Manion, and Michael Willis

Subjects

Pure mathematics, General Mathematics, 010102 general mathematics, Homology (mathematics), Mathematics::Geometric Topology, 01 natural sciences, Floer homology, Mathematics::K-Theory and Homology, 0103 physical sciences, 010307 mathematical physics, 0101 mathematics, Mathematics::Symplectic Geometry, Differential (mathematics), Mathematics, Knot (mathematics)

Abstract

We give a generators-and-relations description of differential graded algebras recently introduced by Ozsváth and Szabó for the computation of knot Floer homology. We also compute the homology of these algebras and determine when they are formal.

Published

2020

4. A novel construction of B-spline-like bases for a family of many knot spline spaces and their application to quasi-interpolation

Author

Salah Eddargani, D. Barrera, and A. Lamnii

Subjects

Pure mathematics, Smoothness, Basis (linear algebra), Degree (graph theory), Applied Mathematics, B-spline, Quasi -interpolation schemes, Computational Mathematics, Identity (mathematics), Spline (mathematics), Computer Science::Graphics, Bernstein-Bezier representation, Hermite interpolation, Polar form, Many knot splines, Mathematics, Knot (mathematics), Interpolation

Abstract

We define a family of univariate many knot spline spaces of arbitrary degree defined on an initial partition that is refined by adding a point in each sub-interval. For an arbitrary smoothness r , splines of degrees 2 r and 2 r + 1 are considered by imposing additional regularity when necessary. For an arbitrary degree, a B-spline-like basis is constructed by using the Bernstein–Bezier representation. Blossoming is then used to establish a Marsden’s identity from which several quasi-interpolation operators having optimal approximation orders are defined.

Published

2022

5. Computing persistent Stiefel-Whitney classes of line bundles

Author

Raphaël Tinarrage, Understanding the Shape of Data (DATASHAPE), Inria Sophia Antipolis - Méditerranée (CRISAM), Institut National de Recherche en Informatique et en Automatique (Inria)-Institut National de Recherche en Informatique et en Automatique (Inria)-Inria Saclay - Ile de France, Institut National de Recherche en Informatique et en Automatique (Inria), Laboratoire de Mathématiques d'Orsay (LMO), and Université Paris-Saclay-Centre National de la Recherche Scientifique (CNRS)

Subjects

Computational Geometry (cs.CG), FOS: Computer and information sciences, Pure mathematics, Vector bundle, [INFO.INFO-CG]Computer Science [cs]/Computational Geometry [cs.CG], 01 natural sciences, Mathematics::Algebraic Topology, 010104 statistics & probability, Mathematics::Algebraic Geometry, Line bundle, Normal bundle, FOS: Mathematics, Filtration (mathematics), Algebraic Topology (math.AT), Stiefel–Whitney classes, Mathematics - Algebraic Topology, Persistent homology, 0101 mathematics, Simplicial approximation, Mathematics::Symplectic Geometry, Mathematics, 010102 general mathematics, Torus, Vector bundles, Cohomology, Bundle, [MATH.MATH-AT]Mathematics [math]/Algebraic Topology [math.AT], Computer Science - Computational Geometry, Knot (mathematics)

Abstract

We propose a definition of persistent Stiefel-Whitney classes of vector bundle filtrations. It relies on seeing vector bundles as subsets of some Euclidean spaces. The usual \v{C}ech filtration of such a subset can be endowed with a vector bundle structure, that we call a \v{C}ech bundle filtration. We show that this construction is stable and consistent. When the dataset is a finite sample of a line bundle, we implement an effective algorithm to compute its persistent Stiefel-Whitney classes. In order to use simplicial approximation techniques in practice, we develop a notion of weak simplicial approximation. As a theoretical example, we give an in-depth study of the normal bundle of the circle, which reduces to understanding the persistent cohomology of the torus knot (1,2). We illustrate our method on several datasets inspired by image analysis., Comment: To appear in Journal of Applied and Computational Topology

Published

2021

6. Rotation Numbers and the Euler Class in Open Books

Author

Sebastian Durst, Joan E. Licata, Marc Kegel, and Publica

Subjects

Pure mathematics, General Mathematics, Boundary (topology), Geometric Topology (math.GT), Homology (mathematics), Mathematics::Geometric Topology, Manifold, Mathematics - Geometric Topology, Intersection, Projection (mathematics), Seifert surface, Mathematics - Symplectic Geometry, FOS: Mathematics, Symplectic Geometry (math.SG), Mathematics::Symplectic Geometry, Euler class, Mathematics, Knot (mathematics)

Abstract

This paper introduces techniques for computing a variety of numerical invariants associated to a Legendrian knot in a contact manifold presented by an open book with a Morse structure. Such a Legendrian knot admits a front projection to the boundary of a regular neighborhood of the binding. From this front projection, we compute the rotation number for any null-homologous Legendrian knot as a count of oriented cusps and linking or intersection numbers; in the case that the manifold has non-trivial second homology, we can recover the rotation number with respect to a Seifert surface in any homology class. We also provide explicit formulas for computing the necessary intersection numbers from the front projection, and we compute the Euler class of the contact structure supported by the open book. Finally, we introduce a notion of Lagrangian projection and compute the classical invariants of a null-homologous Legendrian knot from its projection to a fixed page., 18 pages, 8 figures; V2: Minor corrections, to appear in Michigan Math. J

Published

2021

7. Knot placement in the Distributed non-linear lag models (DNLM) framework

Author

Suneet P. Chauhan, Michael D. Swartz, Kristina W. Whitworth, Alison M. Rector, Mònica Guxens, Elaine Symanski, Carmen Iñiguez, Jesús Ibarluzea, and Jennifer Ish

Subjects

Pure mathematics, Nonlinear system, Lag, General Earth and Planetary Sciences, General Environmental Science, Mathematics, Knot (mathematics)

Published

2021

8. Khovanov–Lipshitz–Sarkar homotopy type for links in thickened higher genus surfaces

Author

Eiji Ogasa, Igor Nikonov, and Louis H. Kauffman

Subjects

Khovanov homology, Pure mathematics, Algebra and Number Theory, Homotopy, Genus (mathematics), Type (model theory), Link (knot theory), Mathematics::Algebraic Topology, Mathematics::Symplectic Geometry, Mathematics::Geometric Topology, Square (algebra), Knot (mathematics), Mathematics

Abstract

We discuss links in thickened surfaces. We define the Khovanov–Lipshitz–Sarkar stable homotopy type and the Steenrod square for the homotopical Khovanov homology of links in thickened surfaces with genus [Formula: see text]. A surface means a closed oriented surface unless otherwise stated. Of course, a surface may or may not be the sphere. A thickened surface means a product manifold of a surface and the interval. A link in a thickened surface (respectively, a 3-manifold) means a submanifold of a thickened surface (respectively, a 3-manifold) which is diffeomorphic to a disjoint collection of circles. Our Khovanov–Lipshitz–Sarkar stable homotopy type and our Steenrod square of links in thickened surfaces with genus [Formula: see text] are stronger than the homotopical Khovanov homology of links in thickened surfaces with genus [Formula: see text]. It is the first meaningful Khovanov–Lipshitz–Sarkar stable homotopy type of links in 3-manifolds other than the 3-sphere. We point out that our theory has a different feature in the torus case.

Published

2021

9. Link quandles are residually finite

Author

Mahender Singh, Manpreet Singh, and Valeriy G. Bardakov

Subjects

Pure mathematics, Low-dimensional topology, 010505 oceanography, General Mathematics, 010102 general mathematics, Geometric Topology (math.GT), Group Theory (math.GR), Combinatorial group theory, Mathematics::Algebraic Topology, Mathematics::Geometric Topology, 01 natural sciences, Mathematics - Geometric Topology, Free product, Mathematics::Quantum Algebra, FOS: Mathematics, 0101 mathematics, Mathematics - Group Theory, 0105 earth and related environmental sciences, Knot (mathematics), Mathematics

Abstract

Residual finiteness is known to be an important property of groups appearing in combinatorial group theory and low dimensional topology. In a recent work [2] residual finiteness of quandles was introduced, and it was proved that free quandles and knot quandles are residually finite. In this paper, we extend these results and prove that free products of residually finite quandles are residually finite provided their associated groups are residually finite. As associated groups of link quandles are link groups, which are known to be residually finite, it follows that link quandles are residually finite., Comment: 11 pages, final version, to appear in Monatshefte f\"ur Mathematik

Published

2019

10. Link cobordisms and absolute gradings in link Floer homology

Author

Ian Zemke

Subjects

Pure mathematics, 010102 general mathematics, Cobordism, Positive-definite matrix, Surface (topology), Adjunction, Mathematics::Algebraic Topology, Mathematics::Geometric Topology, 01 natural sciences, Floer homology, Mathematics::K-Theory and Homology, Genus (mathematics), 0103 physical sciences, 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Link (knot theory), Mathematics::Symplectic Geometry, Mathematical Physics, Mathematics, Knot (mathematics)

Abstract

We show that the link cobordism maps defined by the author are graded and satisfy a grading change formula. Using the grading change formula, we prove a new bound for $\Upsilon_K(t)$ for knot cobordisms in negative definite 4-manifolds. As another application, we show that the link cobordism maps associated to a connected, closed surface in $S^4$ are determined by the genus of the surface. We also prove a new adjunction relation and adjunction inequality for the link cobordism maps. Along the way, we see how many known results in Heegaard Floer homology can be proven using basic properties of the link cobordism maps, together with the grading change formula.

Published

2019

11. Character varieties and knot symmetries

Author

Joan Porti

Subjects

Pure mathematics, Homogeneous space, General Earth and Planetary Sciences, General Environmental Science, Mathematics, Knot (mathematics)

Published

2019

12. Associated graded of Hodge modules and categorical $${\mathfrak {sl}}_2$$ actions

Author

Sabin Cautis, Joel Kamnitzer, and Christopher Dodd

Subjects

Pure mathematics, Functor, General Mathematics, 010102 general mathematics, General Physics and Astronomy, Pushforward (homology), 01 natural sciences, Linear subspace, Mathematics::Algebraic Geometry, Mathematics::K-Theory and Homology, Product (mathematics), Filtration (mathematics), Embedding, Sheaf, 0101 mathematics, Mathematics, Knot (mathematics)

Abstract

One of the most mysterious aspects of Saito’s theory of Hodge modules are the Hodge and weight filtrations that accompany the pushforward of a Hodge module under an open embedding. In this paper we consider the open embedding in a product of complementary Grassmannians given by pairs of transverse subspaces. The push-forward of the structure sheaf under this open embedding is an important Hodge module from the viewpoint of geometric representation theory and homological knot invariants. We compute the associated graded of this push-forward with respect to the induced Hodge filtration as well as the resulting weight filtration. The main tool is a categorical $${\mathfrak {sl}}_2$$ action on the category of $${\mathcal {D}}_h$$ -modules on Grassmannians. Along the way we also clarify the interaction of kernels for $${\mathcal {D}}_h$$ -modules with the associated graded functor. Both of these results may be of independent interest.

Published

2021

13. The Casson Invariant for a Knot in a 3-manifold

Author

Jun Murakami

Subjects

Pure mathematics, Disjoint union (topology), Component (group theory), Extension (predicate logic), Invariant (mathematics), Mathematics::Geometric Topology, Casson invariant, 3-manifold, Quotient, Mathematics, Knot (mathematics)

Abstract

This chapter discusses the Casson invariant of a closed three-manifold for a knot in a closed three-manifold. This is a chord diagram version of the method noted in the end of by Lickorish. It also discusses the extension of the construction of the Casson invariant from the universal Vassiliev-Kontsevich invariant by adding the 3T relation and some natural relations. The semi-simple quotient of this representation is isomorphic to a disjoint union of two copies of the natural representation of SL(2, Z). The contribution from the extension of SL(2, Z) appears in the Levi part of this representation, and this part seems to contain information for the Casson invariant. The Kirby moves correspond to Kirby’s handle slide move, where any component can be changed only along a thin line component since the thick line component is a knot and is not applied the surgery.

Published

2021

14. Local invariants of braiding quantum gates-associated link polynomials and entangling power

Author

Diego Trancanelli, Pramod Padmanabhan, and Fumihiko Sugino

Subjects

Statistics and Probability, Pure mathematics, Quantum Physics, MECÂNICA QUÂNTICA, General Physics and Astronomy, FOS: Physical sciences, Statistical and Nonlinear Physics, Quantum entanglement, Mathematical Physics (math-ph), Action (physics), Power (physics), Quantum gate, Operator (computer programming), Modeling and Simulation, Link (knot theory), Quantum Physics (quant-ph), Eigenvalues and eigenvectors, Mathematical Physics, Mathematics, Knot (mathematics)

Abstract

For a generic $n$-qubit system, local invariants under the action of $SL(2,\mathbb{C})^{\otimes n}$ characterize non-local properties of entanglement. In general, such properties are not immediately apparent and hard to construct. Here we consider certain two-qubit Yang-Baxter operators, which we dub of the `X-type', and show that their eigenvalues completely determine the non-local properties of the system. Moreover, we apply the Turaev procedure to these operators and obtain their associated link/knot polynomials. We also compute their entangling power and compare it with that of a generic two-qubit operator., 43 pages, Published version

Published

2021

15. Linear independence in the rational homology cobordism group

Author

Kyle Larson, Marco Golla, Centre National de la Recherche Scientifique (CNRS), Laboratoire de Mathématiques Jean Leray (LMJL), Centre National de la Recherche Scientifique (CNRS)-Université de Nantes - UFR des Sciences et des Techniques (UN UFR ST), and Université de Nantes (UN)-Université de Nantes (UN)

Subjects

Pure mathematics, Double cover, General Mathematics, 010102 general mathematics, Geometric Topology (math.GT), Cobordism, Homology (mathematics), 16. Peace & justice, 01 natural sciences, Mathematics::Algebraic Topology, Mathematics::Geometric Topology, 57M27, 57R90, Mathematics - Geometric Topology, Mathematics::K-Theory and Homology, [MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT], 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, Linear independence, 0101 mathematics, Mathematics::Symplectic Geometry, Knot (mathematics), Mathematics, Singular homology

Abstract

We give simple homological conditions for a rational homology 3-sphere Y to have infinite order in the rational homology cobordism group, and for a collection of rational homology spheres to be linearly independent. These translate immediately to statements about knot concordance when Y is the branched double cover of a knot, recovering some results of Livingston and Naik. The statements depend only on the homology groups of the 3-manifolds, but are proven through an analysis of correction terms and their behavior under connected sums., 12 pages. To appear in J. Inst. Math. Jussieu

Published

2021

16. Embedding spheres in knot traces

Author

Mark Powell, Allison N. Miller, Arunima Ray, Peter Feller, Matthias Nagel, and Patrick Orson

Subjects

Pure mathematics, Homotopy group, Fundamental group, Algebra and Number Theory, 010308 nuclear & particles physics, Homotopy, 010102 general mathematics, Geometric Topology (math.GT), Alexander polynomial, 01 natural sciences, Mathematics::Algebraic Topology, Mathematics::Geometric Topology, Manifold, Mathematics - Geometric Topology, Arf invariant, 0103 physical sciences, FOS: Mathematics, 0101 mathematics, Abelian group, Knot (mathematics), Mathematics, 57K40, 57K10, 57N35, 57N70, 57R67

Abstract

The trace of the -framed surgery on a knot in is a 4-manifold homotopy equivalent to the 2-sphere. We characterise when a generator of the second homotopy group of such a manifold can be realised by a locally flat embedded -sphere whose complement has abelian fundamental group. Our characterisation is in terms of classical and computable -dimensional knot invariants. For each, this provides conditions that imply a knot is topologically -shake slice, directly analogous to the result of Freedman and Quinn that a knot with trivial Alexander polynomial is topologically slice., Compositio Mathematica, 157 (10), ISSN:0010-437X, ISSN:1570-5846

Published

2021

17. Stable equivalence of bridge positions of a handlebody-knot

Author

Makoto Ozawa

Subjects

Pure mathematics, Primary 57M25, General Mathematics, food and beverages, Geometric Topology (math.GT), Bridge (interpersonal), Reidemeister move, Mathematics - Geometric Topology, surgical procedures, operative, stomatognathic system, mental disorders, FOS: Mathematics, Handlebody, Equivalence (measure theory), psychological phenomena and processes, Mathematics, Knot (mathematics)

Abstract

We show that any two bridge positions of a handlebody-knot are stably equivalent., 14 pages, 18 figures

Published

2020

18. Hopf superpolynomial from topological vertices

Author

Andrei Mironov and Alexei Morozov

Subjects

High Energy Physics - Theory, Physics, Nuclear and High Energy Physics, Pure mathematics, Triality, 010308 nuclear & particles physics, FOS: Physical sciences, Geometric Topology (math.GT), 01 natural sciences, Mathematics - Geometric Topology, High Energy Physics - Theory (hep-th), Colored, Hopf link, 0103 physical sciences, FOS: Mathematics, Brane cosmology, lcsh:QC770-798, lcsh:Nuclear and particle physics. Atomic energy. Radioactivity, 010306 general physics, Knot (mathematics)

Abstract

Link/knot invariants are series with integer coefficients, and it is a long-standing problem to get them positive and possessing cohomological interpretation. Constructing positive "superpolynomials" is not straightforward, especially for colored invariants. A simpler alternative is a multi-parametric generalization of the character expansion, which leads to colored "hyperpolynomials". The third construction involves branes on resolved conifolds, which gives rise to still another family of invariants associated with composite representations. We revisit this triality issue in the simple case of the Hopf link and discover a previously overlooked way to produce positive colored superpolynomials from the DIM-governed four-point functions, thus paving a way to a new relation between super- and hyperpolynomials., Comment: 12 pages

Published

2020

19. Affinization of monoidal categories

Author

Alistair Savage and Youssef Mousaaid

Subjects

Pure mathematics, Trace (linear algebra), 010308 nuclear & particles physics, General Mathematics, 010102 general mathematics, Monoidal category, Primary 18M15, Secondary 18M30, 57K14, 57K31, Mathematics - Category Theory, Characterization (mathematics), 01 natural sciences, Mathematics::Category Theory, 0103 physical sciences, Mathematics - Quantum Algebra, Braid, FOS: Mathematics, Quantum Algebra (math.QA), Category Theory (math.CT), 0101 mathematics, Representation Theory (math.RT), Mathematics - Representation Theory, Knot (mathematics), Mathematics

Abstract

We define the affinization of an arbitrary monoidal category $\mathcal{C}$, corresponding to the category of $\mathcal{C}$-diagrams on the cylinder. We also give an alternative characterization in terms of adjoining dot generators to $\mathcal{C}$. The affinization formalizes and unifies many constructions appearing in the literature. In particular, we describe a large number of examples coming from Hecke-type algebras, braids, tangles, and knot invariants. When $\mathcal{C}$ is rigid, its affinization is isomorphic to its horizontal trace, although the two definitions look quite different. In general, the affinization and the horizontal trace are not isomorphic., 32 pages; v2: minor corrections, published version

Published

2020

20. On the regularity of critical points for O’Hara’s knot energies: From smoothness to analyticity

Author

Nicole Vorderobermeier

Subjects

Pure mathematics, General Mathematics, Knot energy, 01 natural sciences, Mathematics - Geometric Topology, Mathematics - Analysis of PDEs, 0103 physical sciences, FOS: Mathematics, Computer Science::General Literature, 0101 mathematics, Fixed length, 010306 general physics, Mathematics, S-knot, Smoothness (probability theory), Mathematics::Commutative Algebra, Computer Science::Information Retrieval, Applied Mathematics, 010102 general mathematics, Astrophysics::Instrumentation and Methods for Astrophysics, Geometric Topology (math.GT), Computer Science::Computation and Language (Computational Linguistics and Natural Language and Speech Processing), Mathematics::Geometric Topology, Constraint (information theory), 35B65, 57M25, Analysis of PDEs (math.AP), Knot (mathematics)

Abstract

We prove the analyticity of smooth critical points for O’Hara’s knot energies [Formula: see text], with [Formula: see text] and [Formula: see text], subject to a fixed length constraint. This implies, together with the already established regularity results for O’Hara’s knot energies, that bounded energy critical points of [Formula: see text] subject to a fixed length constraint are not only [Formula: see text] but also analytic. Our approach is based on Cauchy’s method of majorants and a decomposition of the gradient that was adapted from the Möbius energy case [Formula: see text].

Published

2020

21. On the equivalence of contact invariants in sutured Floer homology theories

Author

John A. Baldwin and Steven Sivek

Subjects

Pure mathematics, Class (set theory), Magnetic monopole, Boundary (topology), Geological & Geomatics Engineering, Mathematics::Algebraic Topology, 01 natural sciences, 0101 Pure Mathematics, Mathematics - Geometric Topology, 0103 physical sciences, FOS: Mathematics, math.GT, 0101 mathematics, Invariant (mathematics), Equivalence (measure theory), Mathematics::Symplectic Geometry, Mathematics, math.SG, 010102 general mathematics, Geometric Topology (math.GT), 16. Peace & justice, Mathematics::Geometric Topology, Floer homology, Mathematics - Symplectic Geometry, Symplectic Geometry (math.SG), 010307 mathematical physics, Geometry and Topology, Isomorphism, Knot (mathematics)

Abstract

We recently defined an invariant of contact manifolds with convex boundary in Kronheimer and Mrowka's sutured monopole Floer homology theory. Here, we prove that there is an isomorphism between sutured monopole Floer homology and sutured Heegaard Floer homology which identifies our invariant with the contact class defined by Honda, Kazez and Mati\'c in the latter theory. One consequence is that the Legendrian invariants in knot Floer homology behave functorially with respect to Lagrangian concordance. In particular, these invariants provide computable and effective obstructions to the existence of such concordances. Our work also provides the first proof which does not rely on the relative Giroux correspondence that the vanishing or non-vanishing of Honda, Kazez and Mati\'c's contact class is a well-defined invariant of contact manifolds., Comment: 63 pages, 13 figures; v2: corrected Lemma 3.3 and subsequent material, many other small changes; v3: accepted version, substantially revised to correct the proof of the main theorem

Published

2020

22. Cuspidal edges with the same first fundamental forms along a knot

Author

Atsufumi Honda, Masaaki Umehara, Kentaro Saji, Kotaro Yamada, and Kosuke Naokawa

Subjects

First fundamental form, Mathematics - Differential Geometry, Pure mathematics, Algebra and Number Theory, Computer Science::Information Retrieval, Mathematics::Number Theory, Astrophysics::Instrumentation and Methods for Astrophysics, Computer Science::Computation and Language (Computational Linguistics and Natural Language and Speech Processing), Singularity, Differential Geometry (math.DG), Euclidean geometry, FOS: Mathematics, Computer Science::General Literature, Mathematics, Knot (mathematics)

Abstract

Letting $C$ be a compact $C^\omega$-curve embedded in $\boldsymbol R^3$ ($C^\omega$ means real analyticity), we consider a $C^\omega$-cuspidal edge $f$ along $C$. When $C$ is non-closed, in the authors' previous works, the local existence of three distinct cuspidal edges along $C$ whose first fundamental forms coincide with that of $f$ was shown, under a certain reasonable assumption on $f$. In this paper, if $C$ is closed, that is, $C$ is a knot, we show that there exist infinitely many cuspidal edges along $C$ having the same first fundamental form as that of $f$ such that their images are non-congruent to each other, in general., Comment: 12 pages, 2 figures

Published

2020

23. Tensor products of quandles and 1-handles attached to surface-links

Author

Seiichi Kamada

Subjects

Pure mathematics, 010102 general mathematics, Geometric Topology (math.GT), Dihedral angle, 01 natural sciences, Mathematics::Algebraic Topology, Mathematics::Geometric Topology, Knot theory, 010101 applied mathematics, Mathematics - Geometric Topology, Tensor product, Binary operation, 57Q45, Mathematics::Quantum Algebra, FOS: Mathematics, Geometry and Topology, 0101 mathematics, Knot (mathematics), Mathematics

Abstract

A quandle is an algebra with two binary operations satisfying three conditions which are related to Reidemeister moves in knot theory. In this paper we introduce the notion of the (canonical) tensor product of a quandle. The tensor product of the knot quandle or the knot symmetric quandle of a surface-link in 4-space can be used to classify or construct invariants of 1-handles attaching to the surface-link. We also compute the tensor products for dihedral quandles and their symmetric doubles.

Published

2020

24. A new symmetry of the colored Alexander polynomial

Author

V. Mishnyakov, N. Tselousov, and Alexey Sleptsov

Subjects

High Energy Physics - Theory, Nuclear and High Energy Physics, Pure mathematics, Polynomial, Group (mathematics), Structure (category theory), FOS: Physical sciences, Geometric Topology (math.GT), Statistical and Nonlinear Physics, Alexander polynomial, Mathematical Physics (math-ph), Mathematics::Geometric Topology, Mathematics - Geometric Topology, High Energy Physics - Theory (hep-th), Colored, Mathematics - Quantum Algebra, FOS: Mathematics, Quantum Algebra (math.QA), Symmetry (geometry), Invariant (mathematics), Mathematical Physics, Knot (mathematics), Mathematics

Abstract

We present a new conjectural symmetry of the colored Alexander polynomial, that is the specialization of the quantum $$\mathfrak {sl}_N$$ invariant widely known as the colored HOMFLY-PT polynomial. We provide arguments in support of the existence of the symmetry by studying the loop expansion and the character expansion of the colored HOMFLY-PT polynomial. We study the constraints this symmetry imposes on the group theoretic structure of the loop expansion and provide solutions to those constraints. The symmetry is a powerful tool for research on polynomial knot invariants and in the end we suggest several possible applications of the symmetry.

Published

2020

25. Rozansky-Witten geometry of Coulomb branches and logarithmic knot invariants

Author

Sergei Gukov, Po-Shen Hsin, Hiraku Nakajima, Sunghyuk Park, Nikita Sopenko, and Du Pei

Subjects

High Energy Physics - Theory, Pure mathematics, Logarithm, General Physics and Astronomy, FOS: Physical sciences, 01 natural sciences, Mathematics - Algebraic Geometry, Mathematics - Geometric Topology, 0103 physical sciences, Mathematics - Quantum Algebra, Coulomb, FOS: Mathematics, Quantum Algebra (math.QA), 0101 mathematics, Representation Theory (math.RT), Mathematics::Symplectic Geometry, Algebraic Geometry (math.AG), Mathematical Physics, Mathematics, 010102 general mathematics, Geometric Topology (math.GT), Mathematics::Geometric Topology, High Energy Physics - Theory (hep-th), 010307 mathematical physics, Geometry and Topology, Affine transformation, Mathematics - Representation Theory, Knot (mathematics)

Abstract

By studying Rozansky-Witten theory with non-compact target spaces we find new connections with knot invariants whose physical interpretation was not known. This opens up several new avenues, which include a new formulation of $q$-series invariants of 3-manifolds in terms of affine Grassmannians and a generalization of Akutsu-Deguchi-Ohtsuki knot invariants., Comment: 33 pages, 1 figure, 7 tables

Published

2020

26. Witten-Reshetikhin-Turaev function for a knot in Seifert manifolds

Author

Hitoshi Murakami, Yuji Terashima, Kohei Iwaki, and Hiroyuki Fuji

Subjects

High Energy Physics - Theory, Pure mathematics, Root of unity, FOS: Physical sciences, 01 natural sciences, Homology sphere, Classical limit, Interpretation (model theory), 57K31, 57K16, 57K10, Mathematics - Geometric Topology, 0103 physical sciences, FOS: Mathematics, 0101 mathematics, Mathematics::Symplectic Geometry, Mathematical Physics, Mathematics, 010102 general mathematics, Statistical and Nonlinear Physics, Geometric Topology (math.GT), Function (mathematics), Mathematical Physics (math-ph), Mathematics::Geometric Topology, Loop (topology), Character (mathematics), High Energy Physics - Theory (hep-th), 010307 mathematical physics, Knot (mathematics)

Abstract

In this paper, for a Seifert loop (i.e., a knot in a Seifert three-manifold), first we give a family of an explicit function $\Phi(q; N)$ whose special values at roots of unity are identified with the Witten-Reshetikhin-Turaev invariants of the Seifert loop for the integral homology sphere. Second, we show that the function $\Phi(q; N)$ satisfies a $q$-difference equation whose classical limit coincides with a component of the character varieties of the Seifert loop. Third, we give an interpretation of the function $\Phi(q; N)$ from the view point of the resurgent analysis., Comment: 23 pages, 1 figure. References are added in v3

Published

2020

27. Yang-Yang functions, Monodromy and knot polynomials

Author

Wei-Dong Ruan and Peng Liu

Subjects

Nuclear and High Energy Physics, Pure mathematics, Chern-Simons Theories, Spontaneous symmetry breaking, Braid group, FOS: Physical sciences, 01 natural sciences, Quantum Groups, Simple (abstract algebra), Mathematics - Quantum Algebra, 0103 physical sciences, Lie algebra, FOS: Mathematics, Quantum Algebra (math.QA), lcsh:Nuclear and particle physics. Atomic energy. Radioactivity, Symmetry breaking, 0101 mathematics, Representation Theory (math.RT), Mathematical Physics, Physics, 010308 nuclear & particles physics, Wilson, 010102 general mathematics, Mathematical Physics (math-ph), Spontaneous Symmetry Breaking, Monodromy, ’t Hooft and Polyakov loops, Fundamental representation, lcsh:QC770-798, Mathematics - Representation Theory, Knot (mathematics)

Abstract

We derive a structure of ℤ[t, t−1]-module bundle from a family of Yang-Yang functions. For the fundamental representation of the complex simple Lie algebra of classical type, we give explicit wall-crossing formula and prove that the monodromy representation of the ℤ[t, t−1]-module bundle is equivalent to the braid group representation induced by the universal R-matrices of Uh(g). We show that two transformations induced on the fiber by the symmetry breaking deformation and respectively the rotation of two complex parameters commute with each other.

Published

2020

28. Instanton and the depth of taut foliations

Author

Zhenkun Li

Subjects

Pure mathematics, Instanton, Conjecture, General Mathematics, 010102 general mathematics, Taut foliation, Geometric Topology (math.GT), Homology (mathematics), 01 natural sciences, Mathematics::Geometric Topology, Manifold, Mathematics - Geometric Topology, Floer homology, 57M27, Bounded function, FOS: Mathematics, Mathematics::Differential Geometry, 0101 mathematics, Mathematics::Symplectic Geometry, Mathematics, Knot (mathematics)

Abstract

Sutured instanton Floer homology was introduced by Kronheimer and Mrowka. In this paper, we prove that for a taut balanced sutured manifold with vanishing second homology, the dimension of the sutured instanton Floer homology provides a bound on the minimal depth of all possible taut foliations on that balanced sutured manifold. The same argument can be adapted to the monopole and even the Heegaard Floer settings, which gives a partial answer to one of Juhasz's conjectures. Using the nature of instanton Floer homology, on knot complements, we can construct a taut foliation with bounded depth, given some information on the representation varieties of the knot fundamental groups. This indicates a mystery relation between the representation varieties and some small depth taut foliations on knot complements, and gives a partial answer to one of Kronheimer and Mrowka's conjecture., Comment: 14 pages

Published

2020

29. Galois symmetries of knot spaces

Author

Geoffroy Horel and Pedro Boavida de Brito

Subjects

Pure mathematics, Algebra and Number Theory, Homotopy, 010102 general mathematics, Homology (mathematics), 01 natural sciences, Mathematics::Algebraic Topology, Prime (order theory), Mathematics::K-Theory and Homology, Mathematics::Category Theory, 0103 physical sciences, Homogeneous space, Spectral sequence, FOS: Mathematics, Algebraic Topology (math.AT), Mathematics - Algebraic Topology, 010307 mathematical physics, 0101 mathematics, Knot (mathematics), Mathematics

Abstract

We exploit the Galois symmetries of the little disks operads to show that many differentials in the Goodwillie-Weiss spectral sequences approximating the homology and homotopy of knot spaces vanish at a prime $p$. Combined with recent results on the relationship between embedding calculus and finite-type theory, we deduce that the $(n+1)$-st Goodwillie-Weiss approximation is a $p$-local universal Vassiliev invariant of degree $\leq n$ for every $n \leq p + 1$., Comment: 21 pages

Published

2020

30. Computing differential Galois groups of second-order linear $q$-difference equations

Author

Carlos E. Arreche and Yi Zhang

Subjects

Polynomial, Pure mathematics, Mathematics::Number Theory, Galois group, Jones polynomial, Rational function, Commutative Algebra (math.AC), 01 natural sciences, 39A06 (Primary) 12H10, 12H05, 20H20 (Secondary), 0103 physical sciences, FOS: Mathematics, Order (group theory), Number Theory (math.NT), 0101 mathematics, Mathematics, Mathematics - Number Theory, Applied Mathematics, 010102 general mathematics, Mathematics - Rings and Algebras, 16. Peace & justice, Mathematics - Commutative Algebra, Differential Galois theory, Rings and Algebras (math.RA), 010307 mathematical physics, Differential (mathematics), Knot (mathematics)

Abstract

We apply the differential Galois theory for difference equations developed by Hardouin and Singer to compute the differential Galois group for a second-order linear $q$-difference equation with rational function coefficients. This Galois group encodes the possible polynomial differential relations among the solutions of the equation. We apply our results to compute the differential Galois groups of several concrete $q$-difference equations, including for the colored Jones polynomial of a certain knot., Comment: 40 pages

Published

2020

31. Integrability and braided tensor categories

Author

Paul Fendley

Subjects

High Energy Physics - Theory, Pure mathematics, Statistical Mechanics (cond-mat.stat-mech), Conformal field theory, Yang–Baxter equation, Structure (category theory), FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), 01 natural sciences, Topological quantum computer, 010305 fluids & plasmas, High Energy Physics - Theory (hep-th), Tensor (intrinsic definition), 0103 physical sciences, 010306 general physics, Conserved current, Condensed Matter - Statistical Mechanics, Mathematical Physics, Lattice model (physics), Mathematics, Knot (mathematics)

Abstract

Many integrable statistical mechanical models possess a fractional-spin conserved current. Such currents have been constructed by utilising quantum-group algebras and ideas from "discrete holomorphicity". I find them naturally and much more generally using a braided tensor category, a topological structure arising in knot invariants, anyons and conformal field theory. I derive a simple constraint on the Boltzmann weights admitting a conserved current, generalising one found using quantum-group algebras. The resulting trigonometric weights are typically those of a critical integrable lattice model, so the method here gives a linear way of "Baxterising", i.e. building a solution of the Yang-Baxter equation out of topological data. It also illuminates why many models do not admit a solution. I discuss many examples in geometric and local models, including (perhaps) a new solution., Comment: 23 pages

Published

2020

32. Unknotting annuli and handlebody-knot symmetry

Author

Yi-Sheng Wang

Subjects

Pure mathematics, Mathematics::Dynamical Systems, Hyperbolization theorem, Geometric Topology (math.GT), Annulus (mathematics), Symmetry group, Mathematics::Geometric Topology, Mathematics - Geometric Topology, Genus (mathematics), FOS: Mathematics, 57K12, 57K10, 57K20, Geometry and Topology, Symmetry (geometry), Atoroidal, Mathematics::Symplectic Geometry, Handlebody, Mathematics, Knot (mathematics)

Abstract

By Thurston's hyperbolization theorem, irreducible handlebody-knots are classified into three classes: hyperbolic, toroidal, and atoroidal cylindrical. It is known that a non-trivial handlebody-knot of genus two has a finite symmetry group if and only if it is atoroidal. The paper investigates the topology of cylindrical handlebody-knots of genus two that admit an unknotting annulus; we show that the symmetry group is trivial if the unknotting annulus is unique and of type $2$., Comment: 12 pages, 5 figures

Published

2022

33. PSL2(C)-character varieties and Seifert fibered cosmetic surgeries

Author

Huygens C. Ravelomanana

Subjects

Pure mathematics, 010102 general mathematics, Fibered knot, Homology (mathematics), Mathematics::Geometric Topology, 01 natural sciences, Character variety, law.invention, Character (mathematics), law, 0103 physical sciences, 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Mathematics::Symplectic Geometry, Manifold (fluid mechanics), Mathematics, Knot (mathematics)

Abstract

We study small Seifert possibly chiral cosmetic surgeries on not necessarily null-homologous knot in rational homology spheres. We define an absolute semi-norm derived from the Culler–Shalen semi-norm of P S L 2 ( C ) -character variety theory. We prove that two cosmetic slopes must have the same absolute semi-norm and use this result to give a sharp bound on the number of slopes producing the same small Seifert manifold if the ambient manifold satisfies some representation theoretic conditions.

Published

2018

34. Formally integrable complex structures on higher dimensional knot spaces

Author

Domenico Fiorenza and Hông Vân Lê

Subjects

Mathematics - Differential Geometry, Pure mathematics, Integrable system, higher dimensional knot spaces, complex structures, vector cross products, 58D10, 53D15, 46T10, Differential Geometry (math.DG), Mathematics - Symplectic Geometry, FOS: Mathematics, Symplectic Geometry (math.SG), Geometry and Topology, Mathematics::Differential Geometry, Mathematics::Symplectic Geometry, Knot (mathematics), Mathematics

Abstract

Let $S$ be a compact oriented finite dimensional manifold and $M$ a finite dimensional Riemannian manifold, let ${\rm Imm}_f(S,M)$ the space of all free immersions $\varphi:S \to M$ and let $B^+_{i,f}(S,M)$ the quotient space ${\rm Imm}_f(S,M)/{\rm Diff}^+(S)$, where ${\rm Diff}^+(S)$ denotes the group of orientation preserving diffeomorphisms of $S$. In this paper we prove that if $M$ admits a parallel $r$-fold vector cross product $\varphi \in \Omega ^r(M, TM)$ and $\dim S = r-1$ then $B^+_{i,f}(S,M)$ is a formally K\"ahler manifold. This generalizes Brylinski's, LeBrun's and Verbitsky's results for the case that $S$ is a codimension 2 submanifold in $M$, and $S = S^1$ or $M$ is a torsion-free $G_2$-manifold respectively., Comment: 18p version 2: 18p. final version, accepted for Journal of Symplectic Geometry

Published

2019

35. Coloured Alexander polynomials and KP hierarchy

Author

Alexey Sleptsov, S. Mironov, V. Mishnyakov, A. Morozov, and A. D. Mironov

Subjects

High Energy Physics - Theory, Nuclear and High Energy Physics, Polynomial, Pure mathematics, Integrable system, FOS: Physical sciences, Alexander polynomial, System of linear equations, 01 natural sciences, Mathematics - Geometric Topology, Mathematics - Quantum Algebra, 0103 physical sciences, FOS: Mathematics, Quantum Algebra (math.QA), 0101 mathematics, Scaling, Mathematical Physics, Physics, HOMFLY polynomial, Nonlinear Sciences - Exactly Solvable and Integrable Systems, 010308 nuclear & particles physics, 010102 general mathematics, Geometric Topology (math.GT), Mathematical Physics (math-ph), Mathematics::Geometric Topology, Scaling limit, High Energy Physics - Theory (hep-th), Exactly Solvable and Integrable Systems (nlin.SI), Knot (mathematics)

Abstract

We discuss the relation between knot polynomials and the KP hierarchy. Mainly, we study the scaling 1-hook property of the coloured Alexander polynomial: $\mathcal{A}^\mathcal{K}_R(q)=\mathcal{A}^\mathcal{K}_{[1]}(q^{\vert R\vert})$ for all 1-hook Young diagrams $R$. Via the Kontsevich construction, it is reformulated as a system of linear equations. It appears that the solutions of this system induce the KP equations in the Hirota form. The Alexander polynomial is a specialization of the HOMFLY polynomial, and it is a kind of a dual to the double scaling limit, which gives the special polynomial, in the sense that, while the special polynomials provide solutions to the KP hierarchy, the Alexander polynomials provide the equations of this hierarchy. This gives a new connection with integrable properties of knot polynomials and puts an interesting question about the way the KP hierarchy is encoded in the full HOMFLY polynomial., 10 pages

Published

2018

36. On the set of L-space surgeries for links

Author

Eugene Gorsky and András Némethi

Subjects

Pure mathematics, General Mathematics, 010102 general mathematics, Alexander polynomial, Torus, 01 natural sciences, Graph, Bounded function, 0103 physical sciences, 010307 mathematical physics, 0101 mathematics, Algebraic number, Knot (mathematics), Mathematics

Abstract

We study the qualitative structure of the set LS of integral L-space surgery slopes for links with two components. It is known that the set of L-space surgery slopes for a nontrivial L-space knot is always a positive half-line. However, already for two-component torus links the set LS has a very complicated structure, e.g. in some cases it can be unbounded from below. In order to probe the geometry of this set, we ask if it is bounded from below for more general L-space links with two components. For algebraic two-component links we provide three complete characterizations for the boundedness from below: one in terms of the Alexander polynomial, one in terms of the embedded resolution graph, and one in terms of the so-called h-function introduced by the authors in [9] . It turns out that LS is bounded from below for most algebraic links. If it is unbounded from below, it must contain a negative half-line parallel to one of the axes. We also give a sufficient condition for boundedness for arbitrary L-space links.

Published

2018

37. AS++ T-splines: Linear independence and approximation

Author

Jingjing Zhang and Xin Li

Subjects

Pure mathematics, Mechanical Engineering, Computational Mechanics, Mathematical properties, General Physics and Astronomy, 020207 software engineering, 02 engineering and technology, 01 natural sciences, Mathematics::Numerical Analysis, Computer Science Applications, 010101 applied mathematics, Mathematical theory, Computer Science::Graphics, Mechanics of Materials, Dual basis, 0202 electrical engineering, electronic engineering, information engineering, Linear independence, 0101 mathematics, Special case, Knot (mathematics), Mathematics

Abstract

In this paper, we define analysis-suitable++ (AS++) T-splines which include analysis-suitable (AS) T-splines as a special case and maintain all the good mathematical properties as AS T-splines. We prove that AS++ T-splines are always linear independent regardless of the knot values and show that the classical construction of the dual basis for tensor-product B-splines and AS T-splines can be generalized to AS++ T-spline spaces. We also discuss how all of these issues pave the way to a mathematical theory for AS++ T-splines.

Published

2018

38. Kauffman states, bordered algebras, and a bigraded knot invariant

Author

Zoltan Szabo and Peter Ozsvath

Subjects

Pure mathematics, General Mathematics, Alexander polynomial, Homology (mathematics), 01 natural sciences, Mathematics - Geometric Topology, symbols.namesake, Euler characteristic, Differential graded algebra, Mathematics - Quantum Algebra, 0103 physical sciences, FOS: Mathematics, Quantum Algebra (math.QA), 0101 mathematics, Invariant (mathematics), Mathematics, 010102 general mathematics, Geometric Topology (math.GT), Mathematics::Geometric Topology, Knot invariant, Floer homology, Mathematics - Symplectic Geometry, symbols, Symplectic Geometry (math.SG), 010307 mathematical physics, 57R, 57M, Knot (mathematics)

Abstract

We define and study a bigraded knot invariant whose Euler characteristic is the Alexander polynomial, closely connected to knot Floer homology. The invariant is the homology of a chain complex whose generators correspond to Kauffman states for a knot diagram. The definition uses decompositions of knot diagrams: to a collection of points on the line, we associate a differential graded algebra; to a partial knot diagram, we associate modules over the algebra. The knot invariant is obtained from these modules by an appropriate tensor product., Comment: 99 pages. Minor revisions

Published

2018

39. Bézier tilings of the sphere and their applications in benchmarking multipatch isogeometric methods

Author

Francesco Greco, Sander Dedoncker, Florian Maurin, Wim Desmet, and Laurens Coox

Subjects

Pure mathematics, ANTARES, Computer science, Mechanical Engineering, FM_acknowledged, Computational Mechanics, General Physics and Astronomy, Bézier curve, 010103 numerical & computational mathematics, Benchmarking, 01 natural sciences, Computer Science Applications, 010101 applied mathematics, IOF, Mechanics of Materials, Parametric model, FM_affiliated, 0101 mathematics, Knot (mathematics)

Abstract

In this work, we explore new parametric models of a sphere with rational Bézier patches. The geometry is represented as a spherical tessellation with various topologies. The tiles are degeneracy-free rational Bézier surfaces, obtained using a general composite mapping method. Five novel, topologically distinct tilings are described, four of which have conforming parameterizations. The mesh of the fifth tiling is nonconforming despite having equal interface knot vectors (intrinsic nonconformity). We apply these novel geometries in three case studies that are proposed as benchmark problems for C0- and C1-multipatch IGA methods. ispartof: Computer Methods in Applied Mechanics and Engineering vol:332 pages:255-279 status: published

Published

2018

40. ON CORRECT KNOT LATTICES ADMITTING UNIQUE BIVARIATE GRADED LAGRANGE INTERPOLATION FOR CARTESIAN FOLIUM

Author

Da-Yu Feng

Subjects

symbols.namesake, Pure mathematics, law, Lagrange polynomial, symbols, Folium of Descartes, Cartesian coordinate system, Bivariate analysis, Knot (mathematics), law.invention, Mathematics

Published

2018

41. Burau Maps and Twisted Alexander Polynomials

Author

Anthony Conway

Subjects

Pure mathematics, Burau representation, General Mathematics, Braid group, Closure (topology), Geometric Topology (math.GT), Alexander polynomial, Mathematics::Geometric Topology, Mathematics - Geometric Topology, Mathematics::Group Theory, Mathematics::Category Theory, Mathematics::Quantum Algebra, 57M25, FOS: Mathematics, Braid, Link (knot theory), Knot (mathematics), Mathematics

Abstract

The Burau representation of the braid group can be used to recover the Alexander polynomial of the closure of a braid. We define twisted Burau maps and use them to compute twisted Alexander polynomials., 20 pages, 3 figures; v2: minor changes, to appear in Proc. Edinburgh Math. Soc

Published

2018

42. Orthonormal spline systems on ℝ with zero means as bases in H 1(ℝ)

Author

K. A. Keryan

Subjects

Mathematics::Functional Analysis, Pure mathematics, General Mathematics, 010102 general mathematics, 020206 networking & telecommunications, 02 engineering and technology, Hardy space, 01 natural sciences, Spline (mathematics), symbols.namesake, 0202 electrical engineering, electronic engineering, information engineering, symbols, Orthonormal basis, 0101 mathematics, Mathematics, Knot (mathematics)

Abstract

We present a simple geometric characterization of knot sequences for which the corresponding orthonormal spline system of arbitrary order r with zero means is a basis in the Hardy space H 1(ℝ).

Published

2017

43. Exotic Mazur manifolds and knot trace invariants

Author

Kyle Hayden, Lisa Piccirillo, and Thomas E. Mark

Subjects

Pure mathematics, 010308 nuclear & particles physics, General Mathematics, Modulo, 010102 general mathematics, Geometric Topology (math.GT), Homology (mathematics), Mathematics::Geometric Topology, 01 natural sciences, Contractible space, Mathematics - Geometric Topology, Integer, Floer homology, 0103 physical sciences, FOS: Mathematics, 57R55, 57M27, 57R65, 57R58, Mathematics::Differential Geometry, Diffeomorphism, 0101 mathematics, Invariant (mathematics), Mathematics::Symplectic Geometry, Mathematics, Knot (mathematics)

Abstract

From a handlebody-theoretic perspective, the simplest compact, contractible 4-manifolds, other than the 4-ball, are Mazur manifolds. We produce the first pairs of Mazur manifolds that are homeomorphic but not diffeomorphic. Our diffeomorphism obstruction comes from our proof that the knot Floer homology concordance invariant $\nu$ is an invariant of the smooth 4-manifold associated to a knot in the 3-sphere by attaching an n-framed 2-handle to the 4-ball along the knot. In contrast, we also show (modulo forthcoming work of Ozsv\'ath and Szab\'o) that the concordance invariants $\tau$ and $\epsilon$ are not invariants of such 4-manifolds. As a corollary to the existence of exotic Mazur manifolds, we produce integer homology 3-spheres admitting two distinct $S^1 \times S^2$ surgeries, resolving a question from Problem 1.16 in Kirby's list., Comment: 30 pages, 8 figures, 1 table

Published

2021

44. Vassiliev knot invariants derived from cable Γ-polynomials

Author

Hideo Takioka

Subjects

010101 applied mathematics, Pure mathematics, Polynomial, Coprime integers, Mathematics::Quantum Algebra, 010102 general mathematics, Geometry and Topology, 0101 mathematics, Mathematics::Geometric Topology, 01 natural sciences, Mathematics, Knot (mathematics)

Abstract

For coprime integers p ( > 0 ) and q, the ( p , q ) -cable Γ-polynomial of a knot K is the Γ-polynomial of the ( p , q ) -cable knot of K, where the Γ-polynomial is the common zeroth coefficient polynomial of the HOMFLYPT and Kauffman polynomials. In this paper, we give some results on Vassiliev knot invariants derived from the cable Γ-polynomials. In particular, we show that all Vassiliev knot invariants of order ≤4 are determined by the cable Γ-polynomials.

Published

2021

45. Generalized torsion and Dehn filling

Author

Masakazu Teragaito, Tetsuya Ito, and Kimihiko Motegi

Subjects

Pure mathematics, Fundamental group, 010102 general mathematics, Geometric Topology (math.GT), Torsion element, Group Theory (math.GR), Mathematics::Geometric Topology, 01 natural sciences, 010101 applied mathematics, Mathematics - Geometric Topology, Dehn surgery, 57K10, 57M05, 20F05, FOS: Mathematics, Torsion (algebra), Geometry and Topology, 0101 mathematics, Mathematics - Group Theory, Mathematics::Symplectic Geometry, Knot (mathematics), Mathematics

Abstract

A generalized torsion element is a non-trivial element such that some non-empty finite product of its conjugates is the identity. We construct a generalized torsion element of the fundamental group of a 3-manifold obtained by Dehn surgery along a knot in the 3-sphere., 15 pages, 9 figures. We fixed the problem in figures

Published

2021

46. On groups Gnk and Γnk: A study of manifolds, dynamics, and invariants

Author

Seongjeong Kim, D. A. Fedoseev, Vassily Olegovich Manturov, and Igor Nikonov

Subjects

Pure mathematics, Dynamical systems theory, regular triangulation, General Mathematics, small cancellation, regular triangulations, braid, planarity, dynamical system, knot, kirillov–fomin algebra, QA1-939, group, Invariant (mathematics), Geometry and topology, Mathematics, diagram, manifold, Group (mathematics), Coxeter group, coxeter groups, Manifold, pachner move, gnk group, Knot theory, invariant, γnk group, manifold of triangulations, gale diagram, diamond lemma, Knot (mathematics)

Abstract

Recently, the first named author defined a 2-parametric family of groups [Formula: see text] [V. O. Manturov, Non–reidemeister knot theory and its applications in dynamical systems, geometry and topology, preprint (2015), arXiv:1501.05208]. Those groups may be regarded as analogues of braid groups. Study of the connection between the groups [Formula: see text] and dynamical systems led to the discovery of the following fundamental principle: “If dynamical systems describing the motion of [Formula: see text] particles possess a nice codimension one property governed by exactly [Formula: see text] particles, then these dynamical systems admit a topological invariant valued in [Formula: see text]”. The [Formula: see text] groups have connections to different algebraic structures, Coxeter groups, Kirillov-Fomin algebras, and cluster algebras, to name three. Study of the [Formula: see text] groups led to, in particular, the construction of invariants, valued in free products of cyclic groups. All generators of the [Formula: see text] groups are reflections which make them similar to Coxeter groups and not to braid groups. Nevertheless, there are many ways to enhance [Formula: see text] groups to get rid of this [Formula: see text]-torsion. Later the first and the fourth named authors introduced and studied the second family of groups, denoted by [Formula: see text], which are closely related to triangulations of manifolds. The spaces of triangulations of a given manifolds have been widely studied. The celebrated theorem of Pachner [P.L. homeomorphic manifolds are equivalent by elementary shellings, Europ. J. Combin. 12(2) (1991) 129–145] says that any two triangulations of a given manifold can be connected by a sequence of bistellar moves or Pachner moves. See also [I. M. Gelfand, M. M. Kapranov and A. V. Zelevinsky, Discriminants, Resultants, and Multidimensional Determinants (Birkhäuser, Boston, 1994); A. Nabutovsky, Fundamental group and contractible closed geodesics, Comm. Pure Appl. Math. 49(12) (1996) 1257–1270]; the [Formula: see text] naturally appear when considering the set of triangulations with the fixed number of points. There are two ways of introducing the groups [Formula: see text]: the geometrical one, which depends on the metric, and the topological one. The second one can be thought of as a “braid group” of the manifold and, by definition, is an invariant of the topological type of manifold; in a similar way, one can construct the smooth version. In this paper, we give a survey of the ideas lying in the foundation of the [Formula: see text] and [Formula: see text] theories and give an overview of recent results in the study of those groups, manifolds, dynamical systems, knot and braid theories.

Published

2021

47. Rectangular superpolynomials for the figure-eight knot 41

Author

A. Yu. Morozov and Ya. Kononov

Subjects

Pure mathematics, 010308 nuclear & particles physics, Root of unity, 010102 general mathematics, Figure-eight knot, Statistical and Nonlinear Physics, Knot polynomial, Mathematics::Geometric Topology, 01 natural sciences, Group representation, Knot theory, Factorization, 0103 physical sciences, 0101 mathematics, Mathematical Physics, Knot (mathematics), Trefoil knot, Mathematics

Abstract

We rewrite the recently proposed differential expansion formula for HOMFLY polynomials of the knot 41 in an arbitrary rectangular representation R = [rs] as a sum over all Young subdiagrams λ of R with surprisingly simple coefficients of the Z factors. Intriguingly, these coefficients are constructed from the quantum dimensions of symmetric representations of the groups SL(r) and SL(s) and restrict the summation to diagrams with no more than s rows and r columns. Moreover, the β-deformation to Macdonald dimensions yields polynomials with positive integer coefficients, which are plausible candidates for the role of superpolynomials for rectangular representations. Both the polynomiality and the positivity of the coefficients are nonobvious, nevertheless true. This generalizes the previously known formulas for symmetric representations to arbitrary rectangular representations. The differential expansion allows introducing additional gradings. For the trefoil knot 31, to which our results for the knot 41 are immediately extended, we obtain the so-called fourth grading of hyperpolynomials. The property of factorization in roots of unity is preserved even in the five-graded case.

Published

2017

48. The trunkenness of a volume-preserving vector field

Author

Ana Rechtman, Pierre Dehornoy, Institut Fourier (IF ), Centre National de la Recherche Scientifique (CNRS)-Université Grenoble Alpes [2016-2019] (UGA [2016-2019]), Instituto de Matematicas (UNAM), Universidad Nacional Autónoma de México (UNAM), Projet Geospec http://ljk.imag.fr/GeoSpec, UMI LASOL, ANR-11-LABX-0025,PERSYVAL-lab,Systemes et Algorithmes Pervasifs au confluent des mondes physique et numérique(2011), Institut Fourier (IF), Centre National de la Recherche Scientifique (CNRS)-Université Grenoble Alpes (UGA), and ANR-11-LABX-0025-01,PERSYVAL-lab,Systèmes et Algorithmes Pervasifs au confluent des mondes physique et numérique(2011)

Subjects

[PHYS.PHYS.PHYS-FLU-DYN]Physics [physics]/Physics [physics]/Fluid Dynamics [physics.flu-dyn], Pure mathematics, [MATH.MATH-DS]Mathematics [math]/Dynamical Systems [math.DS], FOS: Physical sciences, General Physics and Astronomy, Dynamical Systems (math.DS), 02 engineering and technology, vector field, 01 natural sciences, Mathematics - Geometric Topology, symbols.namesake, 0203 mechanical engineering, [PHYS.PHYS.PHYS-PLASM-PH]Physics [physics]/Physics [physics]/Plasma Physics [physics.plasm-ph], knot, [MATH.MATH-GT]Mathematics [math]/Geometric Topology [math.GT], FOS: Mathematics, Euler equation, Mathematics - Dynamical Systems, 0101 mathematics, Invariant (mathematics), Solar and Stellar Astrophysics (astro-ph.SR), Mathematical Physics, Mathematics, [SDU.ASTR.SR]Sciences of the Universe [physics]/Astrophysics [astro-ph]/Solar and Stellar Astrophysics [astro-ph.SR], Applied Mathematics, 010102 general mathematics, Fluid Dynamics (physics.flu-dyn), Geometric Topology (math.GT), Statistical and Nonlinear Physics, Physics - Fluid Dynamics, 57M25, 37A05, 57M27, 37C50, Helicity, Physics - Plasma Physics, Euler equations, Plasma Physics (physics.plasm-ph), 020303 mechanical engineering & transports, Astrophysics - Solar and Stellar Astrophysics, Knot invariant, invariant, symbols, Vector field, Diffeomorphism, Knot (mathematics)

Abstract

International audience; We construct a new invariant—the trunkenness—for volume-perserving vector fields on S^3 up to volume-preserving diffeomorphism. We prove that the trunkenness is independent from the helicity and that it is the limit of a knot invariant (called the trunk) computed on long pieces of orbits.

Published

2017

49. Odd knot invariants from quantum covering groups

Author

Sean Clark

Subjects

knot invariants, Pure mathematics, quantum groups, 010102 general mathematics, Lie superalgebra, Mathematics::Geometric Topology, 17B37, 01 natural sciences, 57M27, 0103 physical sciences, 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Quantum, Knot (mathematics), Mathematics

Abstract

We show that the quantum covering group associated to [math] has an associated colored quantum knot invariant à la Reshetikhin–Turaev, which specializes to a quantum knot invariant for [math] , and to the usual quantum knot invariant for [math] . In particular, this furnishes an “odd” variant of [math] quantum invariants, even for knots labeled by spin representations. We then show that these knot invariants are essentially the same, up to a change of variables and a constant factor depending on the knot and weight.

Published

2017

50. On universal quantum dimensions

Author

Ruben L. Mkrtchyan

Subjects

High Energy Physics - Theory, Physics, Nuclear and High Energy Physics, Pure mathematics, 010308 nuclear & particles physics, 010102 general mathematics, Adjoint representation, FOS: Physical sciences, Mathematical Physics (math-ph), 01 natural sciences, 17B20, 17B37, High Energy Physics::Theory, High Energy Physics - Theory (hep-th), Quantum mechanics, 0103 physical sciences, Lie algebra, FOS: Mathematics, lcsh:QC770-798, lcsh:Nuclear and particle physics. Atomic energy. Radioactivity, Representation Theory (math.RT), 0101 mathematics, Quantum, Mathematics - Representation Theory, Mathematical Physics, Knot (mathematics)

Abstract

We represent in the universal form restricted one-instanton partition function of supersymmetric Yang-Mills theory. It is based on the derivation of universal expressions for quantum dimensions (universal characters) of Cartan powers of adjoint and some other series of irreps of simple Lie algebras. These formulae also provide a proof of formulae for universal quantum dimensions for low-dimensional representations, needed in derivation of universal knot polynomials (i.e. colored Wilson averages of Chern-Simons theory on 3d sphere). As a check of the (complicated) formulae for universal quantum dimensions we prove numerically Deligne's hypothesis on universal characters for symmetric cube of adjoint representation., Comment: 11 pages, Wording improved, Table 4 simplified

Published

2017