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Valérie Perrier
Valérie Perrier
Professor in Applied Math, Univ. Grenoble Alpes, Grenoble INP
Verified email at imag.fr
Title
Cited by
Cited by
Year
Second-order synchrosqueezing transform or invertible reassignment? Towards ideal time-frequency representations
T Oberlin, S Meignen, V Perrier
IEEE Transactions on Signal Processing 63 (5), 1335-1344, 2015
3842015
Wavelets and turbulence
M Farge, N Kevlahan, V Perrier, E Goirand
Proceedings of the IEEE 84 (4), 639-669, 1996
3641996
A fast algorithm for bidimensional EMD
C Damerval, S Meignen, V Perrier
IEEE signal processing letters 12 (10), 701-704, 2005
3592005
The Fourier-based synchrosqueezing transform
T Oberlin, S Meignen, V Perrier
2014 IEEE international conference on acoustics, speech and signal …, 2014
2942014
Wavelet spectra compared to Fourier spectra
V Perrier, T Philipovitch, C Basdevant
Journal of mathematical physics 36 (3), 1506-1519, 1995
2491995
A new formulation for empirical mode decomposition based on constrained optimization
S Meignen, V Perrier
IEEE Signal Processing Letters 14 (12), 932-935, 2007
1402007
Orthonormal wavelet bases adapted for partial differential equations with boundary conditions
P Monasse, V Perrier
SIAM journal on mathematical analysis 29 (4), 1040-1065, 1998
1341998
La décomposition en ondelettes périodiques, un outil pour l'analyse de champs inhomogčnes: théorie et algorithmes
V Perrier, C Basdevant
La recherche aerospatiale, 53-67, 1989
123*1989
Adaptativité dynamique sur bases d'ondelettes pour l'approximation d'équations aux dérivées partielles
Y Maday, V Perrier, JC Ravel
Comptes rendus de l'Académie des sciences. Série 1, Mathématique 312 (5 …, 1991
1061991
Divergence-free and curl-free wavelets in two dimensions and three dimensions: application to turbulent flows
E Deriaz, V Perrier
Journal of Turbulence, N3, 2006
802006
An alternative formulation for the empirical mode decomposition
T Oberlin, S Meignen, V Perrier
IEEE Transactions on Signal Processing 60 (5), 2236-2246, 2012
782012
Turbulence analysis, modelling and computing using wavelets
M Farge, NKR Kevlahan, V Perrier, K Schneider
Wavelets in Physics, 117-200, 1999
731999
A pseudo-wavelet scheme for the two-dimensional Navier-Stokes equation
P CHARTON13, V Perkier
Computation and Applied Mathematics 15 (2), 139, 1996
731996
Besov norms in terms of the continuous wavelet transform. Application to structure functions
V Perrier, C Basdevant
Mathematical Models and Methods in Applied Sciences 6 (05), 649-664, 1996
561996
Orthogonal Helmholtz decomposition in arbitrary dimension using divergence-free and curl-free wavelets
E Deriaz, V Perrier
Applied and Computational Harmonic Analysis 26 (2), 249-269, 2009
552009
Numerical resolution of nonlinear partial differential equations using the wavelet approach
J Liandrat, V Perrier, P Tchamitchian
Wavelets and their applications, 227-238, 1992
541992
The monogenic synchrosqueezed wavelet transform: a tool for the decomposition/demodulation of AM–FM images
M Clausel, T Oberlin, V Perrier
Applied and Computational Harmonic Analysis 39 (3), 450-486, 2015
452015
Direct numerical simulation of turbulence using divergence-free wavelets
E Deriaz, V Perrier
Multiscale Modeling & Simulation 7 (3), 1101-1129, 2009
372009
Wavelet analysis of 2D turbulent fields
M Do-Khac, C Basdevant, V Perrier, K Dang-Tran
Physica D: Nonlinear Phenomena 76 (1-3), 252-277, 1994
361994
The mortar method in the wavelet context
S Bertoluzza, V Perrier
ESAIM: Mathematical Modelling and Numerical Analysis 35 (4), 647-673, 2001
352001
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