"For each positive integer n we will construct a family of infinitely many hyperbolic prime knots with alternation number 1, dealternating number equal to n, braid index equal to n+3 and Turaev genus equal to n.
We give a complete classification of exceptional surgeries on hyperbolic alternating knots in the 3-...
AbstractWe construct infinitely many hyperbolic links with x-distance far from the set of (possibly,...
A knot is an embedding of a circle S1 into the three-dimensional sphere S3. A component link is an e...
AbstractWe construct infinitely many hyperbolic links with x-distance far from the set of (possibly,...
AbstractWe give an upper bound for the alternation number of a torus knot which is of either 3-, 4-,...
AbstractWe introduce the category of almost alternating links: nonalternating links which have a pro...
The Turaev genus defines a natural filtration on knots where Turaev genus zero knots are precisely t...
AbstractFor any given integer r⩾1 and a quasitoric braid βr=(σr−ϵσr−1ϵ⋯σ1(−1)rϵ)3 with ϵ=±1, we prov...
AbstractWe show that the upper bound of the maximal Thurston–Bennequin number for an oriented altern...
We prove that the meridional rank and the bridge number of the Whitehead double of a prime algebraic...
AbstractWe consider primeness, hyperbolicity, ∂-irreducibility and tangle sums of alternating tangle...
Tesis (Doctorado en Control y Sistemas Dinámicos)"In this thesis we give formulae to obtain the HOMF...
The Turaev genus of a link can be thought of as a way of measuring how nonalternating a link is. A l...
In this thesis, we study knots and links via their alternating diagrams on closed orientable surface...
In this thesis, we study knots and links via their alternating diagrams on closed orientable surface...
We give a complete classification of exceptional surgeries on hyperbolic alternating knots in the 3-...
AbstractWe construct infinitely many hyperbolic links with x-distance far from the set of (possibly,...
A knot is an embedding of a circle S1 into the three-dimensional sphere S3. A component link is an e...
AbstractWe construct infinitely many hyperbolic links with x-distance far from the set of (possibly,...
AbstractWe give an upper bound for the alternation number of a torus knot which is of either 3-, 4-,...
AbstractWe introduce the category of almost alternating links: nonalternating links which have a pro...
The Turaev genus defines a natural filtration on knots where Turaev genus zero knots are precisely t...
AbstractFor any given integer r⩾1 and a quasitoric braid βr=(σr−ϵσr−1ϵ⋯σ1(−1)rϵ)3 with ϵ=±1, we prov...
AbstractWe show that the upper bound of the maximal Thurston–Bennequin number for an oriented altern...
We prove that the meridional rank and the bridge number of the Whitehead double of a prime algebraic...
AbstractWe consider primeness, hyperbolicity, ∂-irreducibility and tangle sums of alternating tangle...
Tesis (Doctorado en Control y Sistemas Dinámicos)"In this thesis we give formulae to obtain the HOMF...
The Turaev genus of a link can be thought of as a way of measuring how nonalternating a link is. A l...
In this thesis, we study knots and links via their alternating diagrams on closed orientable surface...
In this thesis, we study knots and links via their alternating diagrams on closed orientable surface...
We give a complete classification of exceptional surgeries on hyperbolic alternating knots in the 3-...
AbstractWe construct infinitely many hyperbolic links with x-distance far from the set of (possibly,...
A knot is an embedding of a circle S1 into the three-dimensional sphere S3. A component link is an e...
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