Institut de Mathématiques Rue Emile-Argand 11 CH-2000 Neuchâtel COLLOQUE EXTRAORDINAIRE MERCREDI 9 JUILLET 2014

First Page		Document Content
Date: 2014-06-19 10:38:19 Geometric topology Braid theory Braid group Seifert surface University of Neuchâtel Link Braid Knot theory Topology Abstract algebra		Institut de Mathématiques Rue Emile-Argand 11 CH-2000 Neuchâtel COLLOQUE EXTRAORDINAIRE MERCREDI 9 JUILLET 2014 Add to Reading List Source URL: www2.unine.ch Download Document from Source Website File Size: 20,98 KB Share Document on Facebook

	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
	Braid Floer Homology on Surfaces David van der Giessen a thesis submitted to the Department of Mathematics at Utrecht University and VU University in partial fulfillment of the requirements for the degree of Master of Ma DocID: 1rksE - View Document
	The Alexander and Jones Polynomials Through Representations of Rook Algebras Stephen Bigelow∗, Eric Ramos†, Ren Yi‡ arXiv:1110.0538v1 [math.GT] 3 Oct 2011 DocID: 1quuL - View Document
	Configuration Spaces The n-th ordered configuration space C˜ n (M ) of a space M is the space of all n-tupels (ζ1 , . . . , ζn ) of distinct points in M ; and the quotient C n (M ) = C˜ n (M )/Sn by the free action o DocID: 1ph0x - View Document
	Title Abstract Definitions and Examples DocID: 1o61h - View Document