V. Vassiliev [l] introduced a natural filtration in the space of finite order knot invariants. The corresponding grade space has a purely combinatorial description [2] as a space of functions u on the set of chord diagrams satisfying certain linear equations (one- and four-term relations)
We give necessary and sufficient conditions for a weight system on multi- loop chord diagrams to be...
AbstractWe present some combinatorial results in counting various kinds of s.c. chord diagrams. Latt...
. Three results are shown which demonstrate how Vassiliev invariants behave like polynomials. 0. In...
V. Vassiliev [l] introduced a natural filtration in the space of finite order knot invariants. The c...
1.Title page, Table of Contents, Abstract 1.Vassiliev Invariants for knots1 1.1 The classificati...
Recently, Stoimenow [J. Knot Th. Ram. 7 (1998), 93-114] gave an upper bound on the dimension dn of t...
Recently, Stoimenow [J. Knot Th. Ram. 7 (1998), 93-114] gave an upper bound on the dimension dn of t...
By the theory of Vassiliev invariants, the knowledge of a certain algebra B, defined as generated by...
The notion of finite type invariants of virtual knots, introduced by Goussarov, Polyak and Viro, lea...
Since discovery of the Jones polynomial, knot theory has enjoyed a virtual explosion of important re...
The notion of finite type invariants of virtual knots, introduced by Goussarov, Polyak and Viro, lea...
This book provides an accessible introduction to knot theory, focussing on Vassiliev invariants, qua...
AbstractWe present some combinatorial results in counting various kinds of s.c. chord diagrams. Latt...
This paper is an introductory survey of the combinatorial aspects of the Vassiliev theory of knot in...
A bracket weight system is constructed. Three of its applications are given. The first is an observa...
We give necessary and sufficient conditions for a weight system on multi- loop chord diagrams to be...
AbstractWe present some combinatorial results in counting various kinds of s.c. chord diagrams. Latt...
. Three results are shown which demonstrate how Vassiliev invariants behave like polynomials. 0. In...
V. Vassiliev [l] introduced a natural filtration in the space of finite order knot invariants. The c...
1.Title page, Table of Contents, Abstract 1.Vassiliev Invariants for knots1 1.1 The classificati...
Recently, Stoimenow [J. Knot Th. Ram. 7 (1998), 93-114] gave an upper bound on the dimension dn of t...
Recently, Stoimenow [J. Knot Th. Ram. 7 (1998), 93-114] gave an upper bound on the dimension dn of t...
By the theory of Vassiliev invariants, the knowledge of a certain algebra B, defined as generated by...
The notion of finite type invariants of virtual knots, introduced by Goussarov, Polyak and Viro, lea...
Since discovery of the Jones polynomial, knot theory has enjoyed a virtual explosion of important re...
The notion of finite type invariants of virtual knots, introduced by Goussarov, Polyak and Viro, lea...
This book provides an accessible introduction to knot theory, focussing on Vassiliev invariants, qua...
AbstractWe present some combinatorial results in counting various kinds of s.c. chord diagrams. Latt...
This paper is an introductory survey of the combinatorial aspects of the Vassiliev theory of knot in...
A bracket weight system is constructed. Three of its applications are given. The first is an observa...
We give necessary and sufficient conditions for a weight system on multi- loop chord diagrams to be...
AbstractWe present some combinatorial results in counting various kinds of s.c. chord diagrams. Latt...
. Three results are shown which demonstrate how Vassiliev invariants behave like polynomials. 0. In...
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