Browsing by Subject "Legendrian knot"
Now showing 1 - 2 of 2
- Results Per Page
- Sort Options
Item Open Access Classification of Legendrian Knots and Links(2010-05-04T12:02:19Z) Chongchitmate, WutichaiWe write a program in Java to generate all grid diagrams of up to size 10. Using equivalence between grid diagrams modulo a set of Cromwell moves and classification of Legendrian links up to Legendrian isotopy, together with various topological, Legendrian and transverse invariants for knots and links, we classify Legendrian knots and links of arc index up to 9. The main result of this paper consists of two atlases, a Legendrian knot atlas and an atlas for unoriented Legendrian two-component links. In the Legendrian knot atlas, we give information on each Legendrian knot together with conjecture for a mountain range for each knot type. The Legendrian knot atlas illustrates several interesting phenomena such as unusual mountain ranges and transversely non-simple knots. Prior to this paper, such phenomenon was found only in knots with very large number of crossings. The atlas for unoriented Legendrian two-component links also gives information on each unoriented Legendrian link, together with conjecture for its Thurston-Bennequin polytope for each link type. Our result can answer the question posted by Baader and Ishikawa that whether the tb polytope can always be described by the three linear inequalities.Item Open Access ON ARC INDEX AND MAXIMAL THURSTON–BENNEQUIN NUMBER(Journal of Knot Theory and Its Ramifications, 2012-04) Ng, LWe discuss the relation between arc index, maximal ThurstonBennequin number, and Khovanov homology for knots. As a consequence, we calculate the arc index and maximal ThurstonBennequin number for all knots with at most 11 crossings. For some of these knots, the calculation requires a consideration of cables which also allows us to compute the maximal self-linking number for all knots with at most 11 crossings. © 2012 World Scientific Publishing Company.