Tackling Fluid Structures Complexity by the Jones Polynomial

First Page		Document Content
Date: 2014-06-22 16:42:09 Algebra Jones polynomial Skein relation Trefoil knot Knot polynomial Unknot Bracket polynomial Knot invariant Whitehead link Knot theory Topology Abstract algebra		Tackling Fluid Structures Complexity by the Jones Polynomial Add to Reading List Source URL: www.matapp.unimib.it Download Document from Source Website File Size: 396,31 KB Share Document on Facebook

	Proc. Int. Cong. of Math. – 2018 Rio de Janeiro, Vol–1084) KNOT CONTACT HOMOLOGY AND OPEN GROMOV–WITTEN THEORY Tobias Ekholm DocID: 1xTnD - View Document
	BRAID GROUPS, HECKE ALGEBRAS AND KNOT THEORY MARIA CHLOUVERAKI One of the greatest accomplishments in knot theory and low-dimensional topology is the pioneering construction of the Jones polynomial by V. F. R. Jones in 1 DocID: 1v69y - View Document
	Knot Categorification from Geometry, via String Theory Mina Aganagic (UC Berkeley) Abstract: I will describe three paths to categorification of RTW invariants of knots, and the relations between them. The first approach DocID: 1v3D2 - View Document
	MODULE AND FILTERED KNOT HOMOLOGY THEORIES JEFF HICKS Abstract. We provide a new way to define Bar-Natan’s F2 [u] knot homology theory. The u torsion of BN •,• is shown to explicitly give Turner’s spectral sequen DocID: 1tmp7 - View Document
	Topology – 156 www.elsevier.com/locate/top Grope cobordism of classical knots James Conanta , Peter Teichnerb;∗ b DocID: 1r3Vt - View Document