Topics
orbit spaceProgramming language
bijectionDisease
We use an action, of 2l-component string links on l-component string links, defined by the first author and Xiao-Song Lin, to lift the indeterminacy of finite type link invariants. The set of links up to this new indeterminacy is in bijection with the orbit space of the restriction of this action to the stabilizer of the identity. Structure theorems for the sets of links up to C_n-equivalence and Self-C_n-equivalence are also given
We will prove that, for a 2 or 3 component L-space link, HFL- is completely determined by the multi-...
Rapporteurs : Thomas Fiedler, Gregor Masbaum. Jury : Christian Blanchet, Sylvain Gervais, Nathan Hab...
AbstractIn this paper we provide a complete algebraic invariant of link-homotopy, that is, an algebr...
Bar-Natan used Chinese characters to show that finite type invariants classify string links up to ho...
This paper is a generalization of the author\u27s previous work on link homotopy to link concordance...
We define a notion of finite type invariants for links with a fixed linking matrix. We show that Mil...
AbstractWe define finite-type invariants for graphs as functionals on certain finite-dimensional vec...
We show that for links with at most 5 components, the only finite type homotopy invariants are produ...
AbstractIn their 1990 classification of links up to link homotopy, Habegger and Lin prove a Markov-t...
We construct a sequence of concordance invariants for classical links, which depend on the periphera...
this paper as follows: In x1 we recall some basic facts about finite type invariants of links. In x2...
We characterize, in an algebraic and in a diagrammatic way, Milnor string link invariants indexed by...
AbstractWe first present a philosophy which seeks to unify many of the invariants which have arisen ...
AbstractA new approach to the notion of invariant of finite degree is discussed. Using this approach...
We use Polyak\u27s skein relation to give a new proof that Milnor\u27s string link homotopy invarian...
We will prove that, for a 2 or 3 component L-space link, HFL- is completely determined by the multi-...
Rapporteurs : Thomas Fiedler, Gregor Masbaum. Jury : Christian Blanchet, Sylvain Gervais, Nathan Hab...
AbstractIn this paper we provide a complete algebraic invariant of link-homotopy, that is, an algebr...
Bar-Natan used Chinese characters to show that finite type invariants classify string links up to ho...
This paper is a generalization of the author\u27s previous work on link homotopy to link concordance...
We define a notion of finite type invariants for links with a fixed linking matrix. We show that Mil...
AbstractWe define finite-type invariants for graphs as functionals on certain finite-dimensional vec...
We show that for links with at most 5 components, the only finite type homotopy invariants are produ...
AbstractIn their 1990 classification of links up to link homotopy, Habegger and Lin prove a Markov-t...
We construct a sequence of concordance invariants for classical links, which depend on the periphera...
this paper as follows: In x1 we recall some basic facts about finite type invariants of links. In x2...
We characterize, in an algebraic and in a diagrammatic way, Milnor string link invariants indexed by...
AbstractWe first present a philosophy which seeks to unify many of the invariants which have arisen ...
AbstractA new approach to the notion of invariant of finite degree is discussed. Using this approach...
We use Polyak\u27s skein relation to give a new proof that Milnor\u27s string link homotopy invarian...
We will prove that, for a 2 or 3 component L-space link, HFL- is completely determined by the multi-...
Rapporteurs : Thomas Fiedler, Gregor Masbaum. Jury : Christian Blanchet, Sylvain Gervais, Nathan Hab...
AbstractIn this paper we provide a complete algebraic invariant of link-homotopy, that is, an algebr...
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