Geometrical relations and plethysms in the Homfly skein of the annulus ´n H. R. Morton and P. M. G. Mancho Department of Mathematical Sciences University of Liverpool

First Page		Document Content
Date: 2007-07-19 09:11:02 Multilinear algebra Knot theory Ring theory Algebras Elementary symmetric polynomial Ring of symmetric functions Symmetric polynomial HOMFLY polynomial Homogeneous polynomial Mathematics Abstract algebra Polynomials		Geometrical relations and plethysms in the Homfly skein of the annulus ´n H. R. Morton and P. M. G. Mancho Department of Mathematical Sciences University of Liverpool Add to Reading List Source URL: www.liv.ac.uk Download Document from Source Website File Size: 316,92 KB Share Document on Facebook

	NONCOHERENCE OF A CAUSAL WIENER ALGEBRA USED IN CONTROL THEORY AMOL SASANE Abstract. Let C+ := {s ∈ C \| Re(s) ≥ 0} and let A denote the ring ) ( DocID: 1u5my - View Document
	The O-Ring Theory of Economic Development Author(s): Michael Kremer Source: The Quarterly Journal of Economics, Vol. 108, No. 3 (Aug., 1993), ppPublished by: The MIT Press Stable URL: http://www.jstor.org/stabl DocID: 1tKf5 - View Document
	E∞ RING THEORY J.P. MAY http://www.math.uchicago.edu/ may/RANT/ Date: March 13, 2008. DocID: 1sGKb - View Document
	K-THEORY FOR RING C*-ALGEBRAS – THE CASE OF NUMBER FIELDS WITH HIGHER ROOTS OF UNITY arXiv:1201.4296v2 [math.OA] 4 Oct 2012 ¨ DocID: 1sER8 - View Document
	THE HOPF RING FOR P (n) DOUGLAS C. RAVENEL AND W. STEPHEN WILSON Abstract. We show that E∗ (P (n) ), the E-homology of the Ω-spectrum for ∗ P (n), is an E∗ free Hopf ring for E a complex oriented theory with In s DocID: 1rV8C - View Document