Free Online Productivity Tools
i2Speak
i2Symbol
i2OCR
iTex2Img
iWeb2Print
iWeb2Shot
i2Type
iPdf2Split
iPdf2Merge
i2Bopomofo
i2Arabic
i2Style
i2Image
i2PDF
iLatex2Rtf
Sci2ools
FOCM
2011
2011
Compressive Wave Computation
This paper considers large-scale simulations of wave propagation phenomena. We argue that it is possible to accurately compute a wavefield by decomposing it onto a largely incomplete set of eigenfunctions of the Helmholtz operator, chosen at random, and that this provides a natural way of parallelizing wave simulations for memory-intensive applications. Where a standard eigenfunction expansion in general fails to be accurate if a single term is missing, a sparsity-promoting 1 minimization problem can vastly enhance the quality of synthesis of a wavefield from low-dimensional spectral information. This phenomenon may be seen as “compressive sampling in the Helmholtz domain”, and has recently been observed to have a bearing on the performance of data extrapolation techniques in seismic imaging [41]. This paper shows that 1-Helmholtz recovery also makes sense for wave computation, and identifies a regime in which it is provably effective: the one-dimensional wave equation with co...
Real-time TrafficExtrapolation Techniques | FOCM 2011 | Formal Methods | Minimization Problem | Wave Propagation Phenomena |
Related Content
| Added | 28 Aug 2011 |
| Updated | 28 Aug 2011 |
| Type | Journal |
| Year | 2011 |
| Where | FOCM |
| Authors | Laurent Demanet, Gabriel Peyré |
Comments (0)
Researcher Info
|
