English

Local moves on spatial graphs and finite type invariants

Geometric Topology 2007-05-23 v1

Abstract

We define AkA_k-moves for embeddings of a finite graph into the 3-sphere for each natural number kk. Let AkA_k-equivalence denote an equivalence relation generated by AkA_k-moves and ambient isotopy. AkA_k-equivalence implies Ak1A_{k-1}-equivalence. Let F{\cal F} be an Ak1A_{k-1}-equivalence class of the embeddings of a finite graph into the 3-sphere. Let G{\cal G} be the quotient set of F{\cal F} under AkA_k-equivalence. We show that the set G{\cal G} forms an abelian group under a certain geometric operation. We define finite type invariants on F{\cal F} of order (n;k)(n;k). And we show that if any finite type invariant of order (1;k)(1;k) takes the same value on two elements of F{\cal F}, then they are AkA_k-equivalent. AkA_k-move is a generalization of CkC_k-move defined by K. Habiro. Habiro showed that two oriented knots are the same up to CkC_k-move and ambient isotopy if and only if any Vassiliev invariant of order k1\leq k-1 takes the same value on them. The ` if' part does not hold for two-component links. Our result gives a sufficient condition for spatial graphs to be CkC_k-equivalent.

Keywords

Cite

@article{arxiv.math/0106173,
  title  = {Local moves on spatial graphs and finite type invariants},
  author = {Kouki Taniyama and Akira Yasuhara},
  journal= {arXiv preprint arXiv:math/0106173},
  year   = {2007}
}

Comments

LaTeX, 18 pages with figures, to appear in Pacific Journal of Mathematics