Warning: Undefined array key "mm" in /www/wwwroot/www.ai-bt.com/si.php on line 10 Deprecated: trim(): Passing null to parameter #1 ($string) of type string is deprecated in /www/wwwroot/www.ai-bt.com/si.php on line 10 Compressed plane waves yield a compactly supported multiresolution basis for the Laplace operator.

Literature DB >> 24449871

Compressed plane waves yield a compactly supported multiresolution basis for the Laplace operator.

Vidvuds Ozoliņš¹, Rongjie Lai, Russel Caflisch, Stanley Osher.

Abstract

This paper describes an L1 regularized variational framework for developing a spatially localized basis, compressed plane waves, that spans the eigenspace of a differential operator, for instance, the Laplace operator. Our approach generalizes the concept of plane waves to an orthogonal real-space basis with multiresolution capabilities.

Year: 2014 PMID： 24449871 PMCID： PMC3918822 DOI： 10.1073/pnas.1323260111

Source DB: PubMed Journal: Proc Natl Acad Sci U S A ISSN： 0027-8424 Impact factor: 11.205

1 in total

1. Compressed modes for variational problems in mathematics and physics.

Authors: Vidvuds Ozolins; Rongjie Lai; Russel Caflisch; Stanley Osher
Journal: Proc Natl Acad Sci U S A Date: 2013-10-29 Impact factor: 11.205

1 in total

2 in total

1. Compressed modes for variational problems in mathematics and physics.

Authors: Vidvuds Ozolins; Rongjie Lai; Russel Caflisch; Stanley Osher
Journal: Proc Natl Acad Sci U S A Date: 2013-10-29 Impact factor: 11.205

2. Learning partial differential equations via data discovery and sparse optimization.

Authors: Hayden Schaeffer
Journal: Proc Math Phys Eng Sci Date: 2017-01 Impact factor: 2.704

2 in total