DISTINGUISHING MUTANTS BY KNOT POLYNOMIALS HUGH R. MORTON and PETER R. CROMWELL Department of Pure Mathematics, University of Liverpool, PO Box 147, Liverpool, L69 3BX ABSTRACT

First Page		Document Content
Date: 2007-03-13 05:45:53 Abstract algebra Finite type invariant Quantum invariant Knot polynomial Knot invariant Mutation HOMFLY polynomial Jones polynomial Alexander polynomial Knot theory Topology Geometric topology		DISTINGUISHING MUTANTS BY KNOT POLYNOMIALS HUGH R. MORTON and PETER R. CROMWELL Department of Pure Mathematics, University of Liverpool, PO Box 147, Liverpool, L69 3BX ABSTRACT Add to Reading List Source URL: www.liv.ac.uk Download Document from Source Website File Size: 175,08 KB Share Document on Facebook

	Review of SL2 (R) by Serge Lang Given the formalism of quantum mechanics, the study of those of its laws which are invariant under the Lorentz group inevitably leads to infinite-dimensional representations of both the ho DocID: 1uvS5 - View Document
$INVARIANT MEASURES AND ARITHMETIC QUANTUM UNIQUE ERGODICITY ELON LINDENSTRAUSS Abstract. We classify measures on the locally homogeneous space Γ\ SL(2, R) × L which are invariant and have positive entropy under the dia$	INVARIANT MEASURES AND ARITHMETIC QUANTUM UNIQUE ERGODICITY ELON LINDENSTRAUSS Abstract. We classify measures on the locally homogeneous space Γ\ SL(2, R) × L which are invariant and have positive entropy under the dia DocID: 1rN3k - View Document
	Non-local spin field theories in dimension three Matthias Kreck, Stephan Stolz and Peter Teichner August 29, 2014 1 DocID: 1rgzV - View Document
	MILNOR INVARIANTS AND TWISTED WHITNEY TOWERS Page 1 of 41 Abstract This paper describes the relationship between the first non-vanishing Milnor invariants of a DocID: 1qeI1 - View Document
	Simons collaboration on Homological Mirror symmetry Conference Program Friday, May 6 9:45-10:45am Si Li, Tsinghua University Title: “Quantum master equation, chiral algebra, and integrability” DocID: 1pbh6 - View Document