CURRICULUM VITAE NOM : NICAISE PRENOMS : Serge, Elie, César, Ghislain LIEU ET DATE DE NAISSANCE : Neufvilles, le 29 Décembre 1960 NATIONALITE : Française (d origine Belge) DOMICILE : 61, rue Reine de Hongrie, 7063 NEUFVILLES, BELGIQUE ETAT CIVIL : Marié, 3 enfants NOM DU CONJOINT : COL Edith PROFESSION DU CONJOINT : Comptable DIPLOMES OBTENUS : Licence en Sciences Mathématiques, Université de l Etat à Mons (Belgique), le 9 Juillet 1982, mention : La plus grande distinction et les félicitations du Jury Doctorat en Sciences Mathématiques, Université de l Etat à Mons (Belgique), le 21 Février 1986, mention : La plus grande distinction et les félicitations du Jury Membres du Jury : Prof. B. Gramsch (Univ. de Mainz, RFA), Prof. P. Grisvard (Univ. de Nice, France), Prof. G. Lumer (Univ. de Mons, Belgique), Prof. A. Magnus (Univ. de Louvain-la-Neuve, Belgique), Prof. P. Malliavin (Univ. de Paris VII, France). EMPLOIS : 1. Aspirant F.N.R.S. (Belgique) du 1er Octobre 1982 au 30 Septembre 1986 2. Assistant à l Université de l Etat à Mons (Belgique), Département de Mathématique et Recherche Opérationnelle du 1er Octobre 1986 au 30 Septembre 1989 3. Maître de conférences à l U.S.T. LILLE Flandres Artois (26eme section) du 1er Octobre 1989 au 30 Septembre 1992, 1ere classe du 1er Août 1991 au 30 Septembre 1992. 4. Professeur à l Université de Valenciennes (26eme section) depuis le 1er Octobre 1992, 1ere classe en Septembre 2000, classe exceptionnelle depuis le 1er Septembre 2010. LANGUES : FRANCAIS : langue maternelle ANGLAIS : bonnes connaissances 1
NEERLANDAIS : connaissances scolaires 2
1 TRAVAUX-ARTICLES 1.1 Thèse [1] S. NICAISE, Diffusion sur les espaces ramifiés, Université de l Etat à Mons, 1986. 1.2 Revues internationales à comité de lecture [2] S. NICAISE, Estimées du spectre du laplacien sur un réseau topologique fini, C. R. Acad. Sci. Paris Sér. I Math., 303, 1986, p. 343-346. [3] S. NICAISE, Problèmes de Cauchy posés en norme uniforme sur les espaces ramifiés élémentaires, C. R. Acad. Sci. Paris Sér. I Math., 303, 1986, p. 443-446. [4] S. NICAISE, Problèmes aux limites sur les réseaux deux-dimensionnels polygonaux topologiques, C. R. Acad. Sci. Paris Sér. I Math., 303, 1986, p. 699-701. [5] M. BOURLARD, S. NICAISE et L. PAQUET, Résolution du problème de Dirichlet dans un polygone par éléments finis frontières, C. R. Acad. Sci. Paris Sér. I Math., 303, 1986, p. 909-912. [6] S. NICAISE, Spectre des réseaux topologiques finis, Bull. Sci. Math., 2ème série, 111, 1987, p. 401-413. [7] M. DAUGE, M. S. LUBUMA et S. NICAISE, Coefficients des singularités pour le problème de Dirichlet sur un polygone, C. R. Acad. Sci. Paris Sér. I Math., 304, 1987, p. 483-486. [8] M. BOURLARD, S. NICAISE et L. PAQUET, Deux méthodes d éléments finis frontières raffinés pour la résolution du problème de Neumann dans un polygone, C. R. Acad. Sci. Paris Sér. I Math., 305, 1987, p. 311-314. [9] S. NICAISE, Elliptic operators on elementary ramified spaces, Integral Equations Operator Theory, 11, 1988, p. 230-257. [10] S. NICAISE, Problèmes de transmission généralisés et coefficients des singularités-cas W 2,p, C. R. Acad. Sci. Paris Sér. I Math., 306, 1988, p. 369-372. [11] S. NICAISE, Problèmes de transmission généralisés et coefficients des singularités-cas W k+2,p, C. R. Acad. Sci. Paris Sér. I Math., 306, 1988, p. 751-756. [12] S. NICAISE, Le laplacien sur les réseaux deux-dimensionnels polygonaux 3
topologiques, J. Math. Pures Appl., 67, 1988, p. 93-113. [13] M. DAUGE et S. NICAISE, Oblique derivative and interface problems on polygonal domains and networks, Comm. Partial Differential Equations, 14, 1989, p. 1147-1192. [14] M. DAUGE, S. NICAISE, M. BOURLARD et M. S. LUBUMA, Coefficients des singularités pour des problèmes aux limites elliptiques sur un domaine à singularités coniques I : Résultats généraux pour le problème de Dirichlet, RAIRO Modél. Math. Anal. Numér., 24, 1990, p. 27-52. [15] M. DAUGE, S. NICAISE, M. BOURLARD et M. S. LUBUMA, Coefficients des singularités pour des problèmes aux limites elliptiques sur un domaine à singularités coniques II : Quelques opérateurs particuliers, RAIRO Modél. Math. Anal. Numér., 24, 1990, p. 343-367. [16] M. BOURLARD, S. NICAISE et L. PAQUET, An adapted Galerkin method for the resolution of the Dirichlet and Neumann problems in a polygonal domain, Math. Methods Appl. Sci., 12, 1990, p. 251-265. [17] M. BOURLARD, S. NICAISE et L. PAQUET, An adapted boundary element method for the Dirichlet problem in polygonal domains, SIAM J. Numer. Anal., 28, 1991, p. 728-743. [18] S. NICAISE, Differential equations in Hilbert spaces and applications to boundary value problems in nonsmooth domains, J. Funct. Anal., 96, 1991, p. 195-218. [19] M. BOURLARD, M. DAUGE et S. NICAISE, Error estimates on the coefficients obtained by the singular function method, Numer. Funct. Anal. Optim., 10, 1989, p. 1077-1113. [20] S. NICAISE, Polygonal interface problems : Higher regularity results, Comm. Partial Differential Equations, 15, 1990, p. 1475-1508. [21] S. NICAISE, Contrôlabilité exacte d un problème couplé pluri-dimensionnel, C. R. Acad. Sci. Paris Sér. I Math., 311, 1990, p.19-22. [22] M. BOURLARD, M. DAUGE, M. S. LUBUMA et S. NICAISE, Coefficients of the singularities for elliptic boundary value problems on domain with conical points III : Finite element methods on polygonal domains, SIAM J. Numer. Anal., 29, 1992, p.136-155. [23] M. S. LUBUMA et S. NICAISE, Méthodes d éléments finis raffinés pour le problème de Dirichlet dans des polyèdres, C. R. Acad. Sci. Paris Sér. I Math., 315, 1992, p. 1207-1210. [24] S. NICAISE, Exact controllability of a pluridimensional coupled problem, Rev. Mat. Complut., 5, 1992, p. 91-135. 4
[25] A. MAGHNOUJI et S. NICAISE, On a coupled problem between the plate equation and the membrane equation on polygons, Ann. Fac. Sci. Toulouse Math. (6), 1 (2), 1992, p. 187-209. [26] S. NICAISE, About the Lamé system in a polygonal or a polyhedral domain and a coupled problem between the Lamé system and the plate equation I : Regularity of the solutions, Ann. Scuola Norm. Sup. Pisa Cl. Sci. (4), 19, 1992, p. 327-361. [27] F. ALI MEHMETI et S. NICAISE, Nonlinear interaction problems, Nonlinear Anal., 20, 1993, p. 27-61. [28] S. NICAISE, About the Lamé system in a polygonal or a polyhedral domain and a coupled problem between the Lamé system and the plate equation II : Exact controllability, Ann. Scuola Norm. Sup. Pisa Cl. Sci. (4), 20, 1993, p. 163-191. [29] S. NICAISE, The Hille-Yosida and Trotter-Kato theorems for integrated semigroups, J. Math. Anal. Appl., 180, 1993, p. 303-316. [30] S. NICAISE, Polygonal interface problems for the biharmonic operator, Math. Methods Appl. Sci., 17, 1994, p. 21-39. [31] S. NICAISE et A. M. SÄNDIG, General interface problems I, Math. Methods Appl. Sci., 17, 1994, p. 395-429. [32] S. NICAISE et A. M. SÄNDIG, General interface problems II, Math. Methods Appl. Sci., 17, 1994, p. 431-450. [33] M. S. LUBUMA et S. NICAISE, Dirichlet problems in polyhedral domains I : Regularity of the solutions, Math. Nachr., 168, 1994, p. 243-261. [34] M. S. LUBUMA et S. NICAISE, Méthode de fonctions singulières pour problèmes aux limites avec singularités d arêtes, C. R. Acad. Sci. Paris Sér. I Math., 319, 1994, p. 1109-1114. [35] M. S. LUBUMA et S. NICAISE, Dirichlet problems in polyhedral domains II : Approximation by FEM and BEM, J. Comput. Appl. Math., 61, 1995, p. 13-27. [36] S. NICAISE, Contrôlabilité exacte frontière des problèmes de transmission avec singularités, C. R. Acad. Sci. Paris Sér. I Math., 320, 1995, p. 663-668. [37] S. NICAISE, Contrôlabilité exacte frontière de problèmes de transmission en présence de singularités par adjonction de contrôles internes, C. R. Acad. Sci. Paris Sér. I Math., 321, 1995, p. 969-974. [38] J. von BELOW et S. NICAISE, Dynamical interface transition with diffusion in ramified media, Comm. Partial Differential Equations, 21, 1996, 5
p. 255-279. [39] S. NICAISE, Boundary exact controllability of interface problems with singularities I: Addition of the coefficients of singularities, SIAM J. Control Optim., 34, 1996, p. 1512-1533. [40] H. EL BOUZID et S. NICAISE, Méthodes d éléments finis mixtes raffinés pour le problème de Stokes, C. R. Acad. Sci. Paris Sér. I Math., 322, 1996, p. 1075-1080. [41] M. BOURLARD et S. NICAISE, Méthode d éléments finis de bord raffinés pour l équation de la chaleur, C. R. Acad. Sci. Paris Sér. I Math., 323, 1996, p. 1091-1096. [42] B. HEINRICH, S. NICAISE et B. WEBER, Elliptic interface problems in axisymmetric domains I: Singular functions of non-tensorial type, Math. Nachr., 186, 1997, p. 147-165. [43] S. NICAISE, Boundary exact controllability of interface problems with singularities II: Addition of internal controls, SIAM J. Control Optim., 35, 1997, p. 585-603. [44] H. EL BOUZID et S. NICAISE, Nonconforming finite element methods and singularities in polygonal domains, Adv. Math. Sci. Appl., 7, 1997, p. 935-962. [45] S. NICAISE, Regularity of the solutions of elliptic systems in polyhedral domains, Bull. Belg. Math. Soc. Simon Stevin, 4, 1997, p. 411-429. [46] F. ALI MEHMETI et S. NICAISE, Nemetskij s operators and global existence of small solutions of semilinear evolution equations on nonsmooth domains, Comm. Partial Differential Equations, 22, 1997, p. 1559-1588. [47] M. BOURLARD et S. NICAISE, Abstract Green formula and applications to integral equations, Numer. Funct. Anal. Optim., 18, 1997, p. 667-689. [48] A. MAGHNOUJI et S. NICAISE, Coefficients of the singularities of elliptic and parabolic problems in domains with edges, Numer. Funct. Anal. Optim., 18, 1997, p. 805-825. [49] F. ALI MEHMETI et S. NICAISE, Non-autonomous evolution equations on nonsmooth domains, Math. Nachr., 192, 1998, p. 37-70. [50] T. APEL et S. NICAISE, The finite element method with anisotropic mesh grading for elliptic problems in domains with corners and edges, Math. Methods Appl. Sci., 21, 1998, p. 519-549. [51] D. MERCIER et S. NICAISE, Existence results for general systems of differential equations on one-dimensional networks and prewavelets approxi- 6
mation, Discrete Contin. Dynam. Systems, 4, 1998 p. 273-300. [52] C. BOURGEOIS et S. NICAISE, Prewavelet approximations for a system of boundary integral equations for plates with free edges on polygons, Math. Methods Appl. Sci., 21, 1998, p. 1233-1267. [53] B. DEKONINCK et S. NICAISE, Spectre des réseaux de poutres, C. R. Acad. Sci. Paris Sér. I Math., 326, 1998, p. 1249-1254. [54] M. COSTABEL, M. DAUGE et S. NICAISE, Singularities of Maxwell interface problems, M2AN Math. Model. Numer. Anal., 33, 1999, p. 627-649. [55] B. DEKONINCK et S. NICAISE, Control of networks of Euler-Bernoulli beams, ESAIM Control Optim. Calc. Var.,4, 1999, p. 57-82. [56] S. NICAISE et A.-M. SÄNDIG, Transmission problems for the Laplace and elasticity operators: Regularity and boundary integral formulation, Math. Models Methods Appl. Sci., 9, 1999, p. 855-898. [57] C. BOURGEOIS et S. NICAISE, Approximation par préondelettes augmentée de l équation de la plaque libre polygonale, C. R. Acad. Sci. Paris Sér. I Math., 329, 1999, p. 727-730. [58] M. S. LUBUMA et S. NICAISE, Finite element method for elliptic problems with edge corners, J. Comput. Appl. Math., 106, 1999, p. 145-168. [59] M. S. LUBUMA et S. NICAISE, Edge behaviour of the solution of the Stokes problem with applications to the finite element method, Proc. Roy. Soc. Edinburgh Sect. A, 130, 2000, p. 107-140. [60] S. NICAISE, Jacobi polynomials, weighted Sobolev spaces and approximation results of some singularities, Math. Nachr., 213, 2000, p. 117-140. [61] S. LOHRENGEL et S. NICAISE, Les équations de Maxwell dans des matériaux composites: problèmes de densité, C. R. Acad. Sci. Paris Sér. I Math., 330, 2000, p. 991-996. [62] M. FARHLOUL, S. NICAISE et L. PAQUET, Refined mixed finite element method for the Boussinesq equations in polygonal domains, C. R. Acad. Sci. Paris Sér. I Math., 331, 2000, p. 143-148. [63] S. NICAISE et O. PENKIN, Relationship between the lower frequency spectrum of plates and networks of beams, Math. Methods Appl. Sci., 23, 2000, p. 1389-1399. [64] M. FARHLOUL, L. PAQUET et S. NICAISE, A mixed formulation of Boussinesq equations: Analysis of non-singular solutions, Math. Comp., 69, 2000, p. 965-986. [65] S. NICAISE, Exact boundary controllability of Maxwell s equations in 7
heteregeneous media and an application to an inverse source problem, SIAM J. Control Optim., 38, 2000, p. 1145-1170. [66] B. DEKONINCK et S. NICAISE, The eigenvalue problem for networks of beams, Linear Algebra Appl., 314, 2000, p. 165-189. [67] M. S. LUBUMA, S. NICAISE et L. PAQUET, On the Fourier boundary element method for the Laplace equation with edge singularities, Numer. Funct. Anal. Optim., 21, 2000, p. 743-779. [68] B. HEINRICH, S. NICAISE et B. WEBER, Elliptic interface problems in axisymmetric domains II: Convergence analysis of the Fourier-finite element method, Adv. Math. Sci. Appl., 10, 2000, p. 571-600. [69] C. BOURGEOIS et S. NICAISE, Prewavelet analysis of the heat equation, Numer. Math., 87, 2001, p. 407-434. [70] M. FARHLOUL, S. NICAISE et L. PAQUET, Refined mixed finite element method for the Boussinesq equations in polygonal domains, IMA J. Numer. Anal., 21, 2001, p. 525-551. [71] S. NICAISE et O. ZAIR, Identifiability and stability results of one emerging crack in heteregeneous media by one boundary measurement, Math. Methods Appl. Sci., 24, 2001, p. 865-884. [72] S. NICAISE, Edge elements on anisotropic meshes and approximation of the Maxwell equations, SIAM J. Numer. Anal., 39, 2001, p. 784-816. [73] M. BOURLARD, A. MAGHNOUJI, S. NICAISE et L. PAQUET, Asymptotic expansion of the solution of a mixed Dirichlet-Ventcel problem with a small parameter, Asymptot. Anal., 28, 2001, p. 241-278. [74] T. APEL, S. NICAISE et J. SCHÖBERL, Crouzeix-Raviart type finite elements on anisotropic meshes, Numer. Math., 89, 2001, p. 193-223. [75] T. APEL, S. NICAISE et J. SCHÖBERL, A non-conforming finite element method with anisotropic mesh grading for the Stokes problem in domains with edges, IMA J. Numer. Anal., 21, 2001, p. 843-856. [76] M. JUNG, S. NICAISE et J. TABKA, Some multilevel methods on graded meshes, J. Comput. Appl. Math., 138, 2002, p. 151-171. [77] S. LOHRENGEL et S. NICAISE, Maxwell s equations in composite materials: remarks on density, Comm. Partial Differential Equations, 27, 2002, p. 1575-1623. [78] M. FARHLOUL, S. NICAISE et L. PAQUET, Some mixed finite element methods on anisotropic meshes, M2AN Math. Model. Numer. Anal., 35, 2001, p. 907-920. [79] F. ALI MEHMETI, M. BOCHNIAK, S. NICAISE et A.-M. SÄNDIG, 8
Quasilinear elliptic systems of second order in domains with corner singularities, Z. Anal. Anwendungen, 21, 2002, p. 57-90. [80] M. ELLER, J. E. LAGNESE et S. NICAISE, Decay rates for solutions of a Maxwell system with nonlinear boundary damping, Comput. Appl. Math., 21, 2002, p. 135-165. [81] S. NICAISE, M. ELLER et J. E. LAGNESE, Stabilization of heterogeneous Maxwell s equations by nonlinear boundary feedbacks, Electron. J. Differential Equations, 2002, No. 21, 2002, p. 1-26. [82] S. NICAISE, Stability and controllability of the electromagneto-elastic system, Port. Math., 60, 2003, p. 1-34. [83] S. NICAISE et O. ZAIR, Identifiability, stability and reconstruction results of point sources by boundary measurements in heteregeneous trees, Rev. Mat. Complut., 16, 2003, p. 1-28. [84] J. LAZAAR et S. NICAISE, A non-conforming finite element method with anisotropic mesh grading for the incompressible Navier-Stokes equations in domains with edges, Calcolo, 39, 2002, p. 123-168. [85] B. HEINRICH et S. NICAISE, Nitsche mortar finite element method for transmission problems with singularities, IMA J. Numer. Anal., 23, 2003, p. 331-358. [86] S. NICAISE et O. M. PENKIN, Fundamental inequalities on firmly stratified sets and some applications, J. Inequal. Pure Appl. Math., 4 (1), 2003, Article 9, 16 pages. [87] S. NICAISE et O. ZAIR, Identifiability, stability and reconstruction results of sources by interior measurements, Port. Math., 60, 2003, p. 455-471. [88] M. JAOUA, S. NICAISE et L. PAQUET, Identification of cracks with nonlinear impedances, M2AN Math. Model. Numer. Anal., 37, 2003, p. 241-257. [89] S. NICAISE et C. PIGNOTTI, Boundary stabilization of Maxwell s equations with space-time variable coefficients, ESAIM Control Optim. Calc. Var., 9, 2003, p. 563-578. [90] K. DJADEL, S. NICAISE et J. TABKA, Some refined finite volume methods for elliptic problems with corner singularities, Int. J. Finite Vol., 1, 2004, 33 pages. [91] W. CHIKOUCHE, D. MERCIER et S. NICAISE, Regularity of the solution of some unilateral boundary value problems in polygonal and polyhedral domains, Comm. Partial Differential Equations, 29, 2004, p. 43-70. [92] S. NICAISE, Stability and controllability of an abstract evolution equa- 9
tion of hyperbolic type and concrete applications, Rend. Mat. Appl. (7), 23, 2003, p. 83-116. [93] G. KUNERT et S. NICAISE, Zienkiewicz-Zhu error estimators on anisotropic tetrahedral and triangular finite element meshes, M2AN Math. Model. Numer. Anal., 37, 2003, p. 1013-1043. [94] M. COSTABEL, M. DAUGE et S. NICAISE, Singularities of eddy current problems, M2AN Math. Model. Numer. Anal., 37, 2003, p. 807-831. [95] S. NICAISE et E. CREUSÉ, A posteriori error estimation for the heteregeneous Maxwell equations on isotropic and anisotropic meshes, Calcolo, 40, 2003, p. 249-271. [96] S. NICAISE, A posteriori residual error estimation of a cell-centered finite volume method, C. R. Math. Acad. Sci. Paris, 338, 2004, p. 419-424. [97] S. NICAISE et O. ZAIR, Determination of point sources in vibrating beams by boundary measurements: Identifiability, stability and reconstruction results, Electron. J. Differential Equations, 2004, No. 20, 2004, p. 1-17. [98] E. CREUSÉ, G. KUNERT et S. NICAISE, A posteriori error estimation for the Stokes problem: Anisotropic and isotropic discretizations, Math. Models Methods Appl. Sci., 14, 2004, p. 1-48. [99] T. APEL et S. NICAISE, The inf-sup condition for some low order elements on anisotropic meshes, Calcolo, 41, 2004, p. 89-113. [100] S. NICAISE et O. M. PENKIN, Poincaré-Perron s method for the Dirichlet problem on stratified sets, J. Math. Analysis Appl., 296, 2004, p. 504-520. [101] K. DJADEL et S. NICAISE, Some refined finite volume methods for the Stokes and Navier-Stokes systems with corner singularities, J. Numer. Math., 12, 2004, p. 255-284. [102] M. FARHLOUL, S. NICAISE et L. PAQUET, A posteriori error estimation for the dual mixed finite element method of the Stokes problem, C. R. Math. Acad. Sci. Paris, 339, 2004, p. 513-518. [103] S. NICAISE et O. M. PENKIN, Solvability of the Dirichlet problem on stratified sets, J. Math. Sci. (N. Y.), 123, 2004, p. 4404-4427. [104] A. HEMINNA, S. NICAISE et A. SENE, Stabilisation d un système de la thermoélasticité anisotrope avec feedbacks non linéaire, C. R. Math. Acad. Sci. Paris, 339, 2004, p. 561-566. [105] D. MERCIER et S. NICAISE, Regularity of the solution of some unilateral boundary value problems in polygonal domains, Math. Nachr., 278, 2005, p. 692-702. 10
[106] S. NICAISE et K. DJADEL, Convergence analysis of a finite volume method for the Stokes system using nonconforming arguments, IMA J. Numer. Analysis, 25, 2005, p. 523-548. [107] S. NICAISE et C. PIGNOTTI, Internal stabilization of Maxwell s equations in heterogeneous media, Abstr. Appl. Anal., 7, 2005, p. 791-811. [108] A. HEMINNA, S. NICAISE et A. SENE, Stabilization of a system of anisotropic thermoelasticity by nonlinear boundary and internal feedbacks, Quart. Appl. Math., 53, 2005, p. 429-453. [109] S. NICAISE et N. SOUALEM, A posteriori error estimations for a nonconforming finite element discretization of the heat equation, M2AN Math. Model. Numer. Anal., 39, 2005, p. 319-348. [110] D. MERCIER et S. NICAISE, Existence, uniqueness and regularity results for piezoelectric systems, SIAM J. Math. Anal., 37, 2005, p. 651-672. [111] S. NICAISE, A posteriori error estimations of some cell-centered finite volume methods, SIAM J. Numer. Anal., 43, 2005, p. 1481-1503. [112] S. NICAISE, On Zienkiewicz Zhu error estimators for Maxwell s equations, C. R. Math. Acad. Sci. Paris, 340, 2005, p. 697-702. [113] P. HILD et S. NICAISE, A posteriori error estimations of residual type for Signorini s problem, Numer. Math., 101, 2005, p. 523-549. [114] E. CREUSÉ et S. NICAISE, Anisotropic a posteriori error estimation for the mixed discontinuous Galerkin approximation of the Stokes problem, Numer. Methods Partial Differential Equations, 22, 2006, p. 449-483. [115] S. NICAISE et E. CREUSÉ, Isotropic and anisotropic a posteriori error estimation for the mixed finite element method of second order operators in divergence form, Electron. Trans. Numer. Anal., 23, 2006, p. 38-62. [116] S. NICAISE, A posteriori error estimations of some cell-centered finite volume methods for diffusion-convection-reaction problems, SIAM J. Numer. Anal., 44, 2006, p. 949-978. [117] S. NICAISE et C. PIGNOTTI, Internal and boundary observability estimates for heterogeneous Maxwell s system, Appl. Math. Optim., 54, 2006, p. 47-70. [118] E. CREUSÉ et S. NICAISE, Discrete compactness for a discontinuous Galerkin approximation of Maxwell s system, M2AN Math. Model. Numer. Anal., 40, 2006, p. 413-430. [119] S. NICAISE et A. SENE, Stabilization of a coupled multidimensional system, Rev. Mat. Complut., 19, 2006, p. 277-296. [120] A. MAGHNOUJI et S. NICAISE, Boundary layers for transmission 11
problems with singularities, Electronic J. Diff. Equations, 2006, 2006, No 14, p. 1-16. [121] S. NICAISE et S. A. SAUTER, Efficient numerical solution of Neumann problems on complicated domains, Calcolo, 43, 2006, p. 95-120. [122] K. DJADEL et S. NICAISE, A finite volume method for the twodimensional stationary Navier-Stokes system, Comput. Methods Appl. Math., 6, 2006, 134-153. [123] S. NICAISE et C. PIGNOTTI, Stability and instability results of the wave equation with a delay term in the boundary or internal feedbacks, SIAM J. Control Optim., 45, 2006, 1561-1585. [124] M. FARHLOUL, S. NICAISE et L. PAQUET, A posteriori error estimation for the dual mixed finite element method of the Stokes problem, Numer. Funct. Anal. Optim., 27, 2006, p. 831-846. [125] S. NICAISE et C. PIGNOTTI, Stabilization of the wave equation with variable coefficients and boundary condition of memory type, Asymptot. Anal., 50, 2006, p. 31-67. [126] S. LOHRENGEL et S. NICAISE, A discontinuous Galerkin method on refined meshes for the 2D time-harmonic Maxwell equations in composite materials, J. Comput. Appl. Math., 206, 2007, p. 27-54. [127] S. NICAISE et A. M. SÄNDIG, Dynamical crack propagation in a 2D elastic body: The out-of plane state, J. Math. Analysis Appl., 329, 2007, p. 1-30. [128] S. COCHEZ et S. NICAISE, Robust a posteriori error estimation for the Maxwell equations, Comput. Methods Appl. Mech. Engrg., 196, 2007, p. 2583-2595. [129] S. NICAISE, L. PAQUET et RAFILIPOJAONA, A refined mixed finite element method for the stationary Navier-Stokes equations with mixed boundary conditions using Lagrange multipliers, Comput. Methods Appl. Math., 7, 2007, p. 83-100. [130] S. NICAISE et C. PIGNOTTI, Energy decay rates for solutions of Maxwell s system with a memory boundary condition, Collect. Math., 58, 2007, p. 327-342. [131] T. APEL et S. NICAISE, A posteriori error estimations of a SUPG method for anisotropic diffusion-convection-reaction problems, C. R. Math. Acad. Sci. Paris, 345, 2007, p. 657-662. [132] S. NICAISE et J. VALEIN, Stabilization of the wave equation on 1-d networks with a delay term in the nodal feedbacks, Netw. Heterog. Media, 12
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