The Curvelet Representation of Wave Propagators is Optimally Sparse Emmanuel J. Cand`es and Laurent Demanet Applied and Computational Mathematics California Institute of Technology Pasadena, California 91125 - Microlocal analysis - Document - PDFSEARCH.IO

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	The Curvelet Representation of Wave Propagators is Optimally Sparse Emmanuel J. Cand`es and Laurent Demanet Applied and Computational Mathematics California Institute of Technology Pasadena, California 91125 Add to Reading List Document Date: 2013-08-09 15:51:51 Open Document File Size: 719,32 KB Share Result on Facebook Company Hyperbolic Systems / / Facility Computational Mathematics California Institute of Technology Pasadena / / IndustryTerm linear symmetric systems / faster algorithms / matrix inversion algorithms / solution operator / curvelet-like systems / rapid algorithms / signal processing / usual inner product / wave / low complexity algorithms / seismic imaging / symmetric systems / scientific computing / numerical low-complexity algorithms / classical multiscale systems / numerical applications / energy / / Organization Computational Mathematics California Institute of Technology Pasadena / National Science Foundation / / Person Guillaume Bal / Emmanuel J. Cand`es / Hart Smith / / ProvinceOrState California / / Technology geophysics / numerical low-complexity algorithms / matrix inversion algorithms / low complexity algorithms / / SocialTag Fourier analysis Wave mechanics Partial differential equations Linear algebra Fourier integral operator Microlocal analysis Fourier transform Wavelet Wave equation Mathematical analysis

The Curvelet Representation of Wave Propagators is Optimally Sparse Emmanuel J. Cand`es and Laurent Demanet Applied and Computational Mathematics California Institute of Technology Pasadena, California 91125Add to Reading List