Metric sparsification and operator norm localization Xiaoman Chen, Romain Tessera, Xianjin Wang, Guoliang Yu November 13, 2007 Abstract We study an operator norm localization property and its applications

First Page		Document Content
Date: 2007-11-13 16:29:19 Mathematics Mathematical analysis Algebra Field theory Measure theory Commutative algebra Localization Valuation ring Metric space Ergodic flow Abelian von Neumann algebra		Metric sparsification and operator norm localization Xiaoman Chen, Romain Tessera, Xianjin Wang, Guoliang Yu November 13, 2007 Abstract We study an operator norm localization property and its applications Add to Reading List Source URL: www.normalesup.org Download Document from Source Website File Size: 196,01 KB Share Document on Facebook

	Large scale Sobolev inequalities on metric measure spaces and applications. Romain Tessera October 29, 2010 Abstract For functions on a metric measure space, we introduce a notion of DocID: 1xTnT - View Document
	FolderSizes - Fact Sheet Powerful Disk Space Analysis Software for the Enterprise FolderSizes is a powerful disk space analysis, visualization, and management software product created by Key Metric Software. It runs on a DocID: 1u21e - View Document
	Navigating nets: Simple algorithms for proximity search [Extended Abstract] Robert Krauthgamer Abstract We present a simple deterministic data structure for maintaining a set S of points in a general metric space, DocID: 1tkx7 - View Document
	AN EQUIVARIANT CW -COMPLEX FOR THE FREE LOOP SPACE OF A FINSLER MANIFOLD HANS-BERT RADEMACHER Abstract. We consider a compact manifold M with a bumpy Finsler metric. The free loop space Λ of M carries a canonical action DocID: 1sNfe - View Document
	Lecture by John F. Nash Jr. An Interesting Equation The equation that we have discovered is a 4th order covariant tensor partial differential equation applicable to the metric tensor of a space-time. It is simplest in fo DocID: 1sCq0 - View Document