A note on the weak splitting number
Abstract
The weak splitting number of a link is the minimal number of crossing changes needed to turn into a split union of knots. We describe conditions under which certain -valued link invariants give lower bounds on . This result is used both to obtain new bounds on in terms of the multivariable signature and to recover known lower bounds in terms of the and -invariants. We also establish new obstructions using link Floer homology and apply all these methods to compute for all but two of the prime links with or fewer crossings.
Keywords
Cite
@article{arxiv.1911.05677,
title = {A note on the weak splitting number},
author = {Alberto Cavallo and Carlo Collari and Anthony Conway},
journal= {arXiv preprint arXiv:1911.05677},
year = {2020}
}
Comments
15 pages, 3 figures and 2 tables. Accepted for publication in the Proceedings of the AMS. Changes from v1: Found an error in Theorem 3.5, which affected Theorem 1.4. The statement of Theorem 1.4 has been fixed, and its applications (Example 3.6, now 3.5) has been modifed accordingly. Removed Theorem 3.5. Corrected typo in Table 1 (L9n28). Typos fixed and exposition improved