AbstractWe introduce a graph diagram which can be regarded as a generalized link diagram. By using it, we construct two polynomial invariants for knots and links which are distinct from both the HOMFLY and the Kauffman polynomials. We show some features of the polynomials including relationships with the HOMFLY and the Kauffman polynomials
This thesis presents an investigation of many known polynomial invariants of knots and links. Follow...
AbstractFor an oriented virtual link diagram, Kauffman defined the f-polynomial. In this paper we gi...
We present the new skein invariants of classical links, H [ H ] , K [ K ] and D [...
AbstractWe introduce a graph diagram which can be regarded as a generalized link diagram. By using i...
AbstractY. Miyazawa defined a polynomial invariant for a virtual link by using magnetic graph diagra...
AbstractConway's mutation of a link is achieved by flipping a 2-strand tangle. Two mutant links shar...
AbstractWe study the parametrized complexity of the knot (and link) polynomials known as Jones polyn...
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
AbstractVirtual knots are associated with knot diagrams, which are not obligatory planar. The recent...
In this MSc thesis, which deals with certain topics from knot theory, we will engage with the proble...
AbstractA (tame) link can be defined as a finite collection of disjoint polygons embedded in Euclide...
Virtual knots are associated with knot diagrams, which are not obligatory planar. The recently sugge...
Following the recent work by T.-H. Chan in [HOMFLY polynomial of some generalized Hopf links, J. Kno...
This thesis uses Kauffman skein theory to give several new results. We show a correspondence between...
A knot invariant called the Jones polynomial will be defined in two ways, as the Kauffman Bracket po...
This thesis presents an investigation of many known polynomial invariants of knots and links. Follow...
AbstractFor an oriented virtual link diagram, Kauffman defined the f-polynomial. In this paper we gi...
We present the new skein invariants of classical links, H [ H ] , K [ K ] and D [...
AbstractWe introduce a graph diagram which can be regarded as a generalized link diagram. By using i...
AbstractY. Miyazawa defined a polynomial invariant for a virtual link by using magnetic graph diagra...
AbstractConway's mutation of a link is achieved by flipping a 2-strand tangle. Two mutant links shar...
AbstractWe study the parametrized complexity of the knot (and link) polynomials known as Jones polyn...
AbstractWe give an explicit formula for the fact given by Links and Gould that a one variable reduct...
AbstractVirtual knots are associated with knot diagrams, which are not obligatory planar. The recent...
In this MSc thesis, which deals with certain topics from knot theory, we will engage with the proble...
AbstractA (tame) link can be defined as a finite collection of disjoint polygons embedded in Euclide...
Virtual knots are associated with knot diagrams, which are not obligatory planar. The recently sugge...
Following the recent work by T.-H. Chan in [HOMFLY polynomial of some generalized Hopf links, J. Kno...
This thesis uses Kauffman skein theory to give several new results. We show a correspondence between...
A knot invariant called the Jones polynomial will be defined in two ways, as the Kauffman Bracket po...
This thesis presents an investigation of many known polynomial invariants of knots and links. Follow...
AbstractFor an oriented virtual link diagram, Kauffman defined the f-polynomial. In this paper we gi...
We present the new skein invariants of classical links, H [ H ] , K [ K ] and D [...
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