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On derivatives of link polynomials

✍ Scribed by W.B.R Lickorish; Y Rong

Publisher
Elsevier Science
Year
1998
Tongue
English
Weight
470 KB
Volume
87
Category
Article
ISSN
0166-8641

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✦ Synopsis

The higher order link polynomials are a class of link invariants related to both Homfly polynomial and Vassiliev invariants. Here we study their partial derivatives. We prove that each partial derivative of an nth order Homfly polynomial is an (n + 1)th order Homfly polynomial. In particular, each dth partial derivative of the Homfly polynomial is a dth order Homfly polynomial. For d = 1, we show that these derivatives span all the first order Homfly polynomials. Similar constructions are made for other link polynomials. Questions on linear span and computational complexities are discussed.

πŸ“œ SIMILAR VOLUMES

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Starting with the link invariant G"p\q\z#\ a skein relation is introduced which enables us to calculate the polynomial starting with G"p\q\z# 0\ for the unknot[ The relation between G"p\q\z# and the known 1!variable link invariant K"l\m# is shown[ Then the polynomial of some common knots is calculat