CERFACS CERFACS Scientific Activity Report Jan. 2010 – Dec. 2011

5 Publications
5.1 Conference Proceedings
[EMA1] A. BENDALI, M. FARES, K. LEMRABET, F. MILLOT, and S. PERNET, (2011), A Combined Field Integral
Equation for Higher-order Generalized Impedance Conditions, Marrakesh, Morocco, PIERS.
[EMA2] A. BONNET, J. MERCIER, and F. MILLOT, (2011), Time harmonic acoustic scattering in presence of a shear
flow and a Myers impedance condition, Portland, 32nd AIAA Aeroacoustics Conference.
[EMA3] J. LAURENT, V. MOUYSSET, S. PERNET, and X. FERRIERES, (2011), Development of an adaptive mesh in a
discontinuous Galerkin method for time Maxwells equations, Vancouver, Waves.
[EMA4] D. LEVADOUX, F. MILLOT, and S. PERNET, (2010), Comparison between the Classical Integral Equations
and a Well Conditioned Integral Equation, Cambridge, USA, PIERS.
[EMA5] D. LEVADOUX, F. MILLOT, and S. PERNET, (2010), Intrinsically well-conditioned integral equations for
scattering by homogeneous bodies, Toulouse, France, SCEE.
[EMA6] E. PEYNAUD, F. MILLOT, S. PERNET, A. BONNET, and J. MERCIER, (2011), A mixed
continuous/discontinuous finite element method for acoustics in an arbitrary flow, Vancouver, Waves.
[EMA7] E. PEYNAUD, F. MILLOT, S. PERNET, A. BONNET, and J. MERCIER, (2011), Galbrun based numerical
scheme to compute time-harmonic scattering in an arbitrary mean flow, Portland, 32nd AIAA Aeroacoustics
Conference.
[EMA8] E. PEYNAUD, (2010), Résolution de l’équation d’advection en régime harmonique, , CANUM.
5.2 Journal publications
[EMA9] B. BENDALI, A. MAKHLOUF, and S. TORDEUX, (2010), Justification of the cavity model in the numerical
simulation of patch antennas by the method of matched asymptotic expansions, SIAM Multiscale Modeling and
Simulation, 8, 1902–1922.
[EMA10] B. BENDALI, A. MAKHLOUF, and S. TORDEUX, (2011), Field behavior near the edge of a patch antenna by
the method of matched asymptotic expansions, Quaterly of Applied Mathematics, 69, 691–721.
[EMA11] A. BONNET-BEN DHIA, J. MERCIER, F. MILLOT, and S. PERNET, (2010), A low-Mach number model for
time-harmonic acoustics in arbitrary flows, Journal of Computational and Applied Mathematics, 234, 1868–1875.
[EMA12] A. BONNET-BEN DHIA, J. MERCIER, E. REDON, and S. POERNOMI SARI, (2011), Non-reflecting boundary
conditions for acoustic propagation in ducts with acoustic treatment and mean flow, Int. J. Numer. Methods Eng., 86,
1360–1378.
[EMA13] F. COLLINO and X. CLAEYES, (2010), Augmented Galerkin Scheme for the Solution of Scattering by small
obstacles, Numerische Mathematik, 116, 246–268.
[EMA14] A. COSSONIÈRE and H. HADDAR, (2011), The electromagnetic interior transmission problem for regions
with cavities, SIAM J. Math. Anal., 43, 1698–1715.
[EMA15] M. FARES, S. GRATTON, and P. TOINT, (2011), Fast regularized linear sampling for inverse scattering
problems, Num. Linear Algebra with Apllications, 18, 55–68.
[EMA16] M. FARES, J. HESTHAVEN, Y. MADAY, and B. STAMM, (2011), Reduced Basis Method for the parametrized
Electric Field Integral Equation, J. Comput. Phys., 14, 5532–5555.
[EMA17] D. LEVADOUX, F. MILLOT, and S. PERNET, (2010), New Trends in the Preconditioning of Integral
Equations of Electromagmetism, Mathematics in Industry, 14, 383–394.
[EMA18] S. PERNET, (2010), A well-conditioned integral equation for iterative solution of scattering problems with a
variable Leontovitch boundary condition, Mathematical Modelling and Numerical Analysis, 44, 781–801.
68 Jan. 2010 – Dec. 2011