Lagrangian Subspaces, Delta-Matroids, and Four-Term Relations

Abstract: Finite order invariants (Vassiliev invariants) of knots are expressed in terms of weight systems, that is, functions on chord diagrams satisfying the four-term relations. Weight systems have graph analogues, so-called 4-invariants of graphs, i.e. functions on graphs that satisfy the four-term relations for graphs. Each 4-invariant determines a weight system.The notion of weight system is naturally generalized for the case of embedded graphs with an arbitrary number of vertices. Such embedded graphs correspond … Show more

“…In [4], the 4-term relations for Lagrangian subspaces were introduced, which also can be considered as a combinatorial counterpart of the 4-term relations for embedded graphs. V. Zhukov [12] proved the equivalence of this approach to the one for binary delta-matroids.…”

The interlace polynomial of binary delta-matroids and link invariants

“…In [4], the 4-term relations for Lagrangian subspaces were introduced, which also can be considered as a combinatorial counterpart of the 4-term relations for embedded graphs. V. Zhukov [12] proved the equivalence of this approach to the one for binary delta-matroids.…”

The interlace polynomial of binary delta-matroids and link invariants

“…It is shown in [17] that the Hopf algebra B of binary delta-matroids is naturally isomorphic to the Hopf algebra of Lagrangian spaces in vector spaces over F 2 introduced in [6].…”

An extension of Stanley's chromatic symmetric function to binary delta-matroids

An extension of Stanley's chromatic symmetric function to binary delta-matroids