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] NICAISE S., 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. Sc. Paris, 303, Série I, 1986, p. 343-346. [3] S. NICAISE, Problèmes de Cauchy posés en norme uniforme sur les espaces ramifiés élémentaires, C. R. Acad. Sc. Paris, 303, Série I, 1986, p. 443-446. [4] S. NICAISE, Problèmes aux limites sur les réseaux deux-dimensionnels polygonaux topologiques, C. R. Acad. Sc. Paris, 303, Série I, 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. Sc. Paris, 303, série I, 1986, p. 909-912. [6] S. NICAISE, Spectre des réseaux topologiques finis, Bull. Sc. 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. Sc. Paris, 304, Série I, 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. Sc. Paris, 305, Série I, 1987, p. 311-314. [9] S. NICAISE, Elliptic operators on elementary ramified spaces, Integral Eq. and Op. Theory, 11, 1988, p. 230-257. [10] S. NICAISE, Problèmes de transmission généralisés et coefficients des singularités-cas W 2,p, C. R. Acad. Sc. Paris, 306, Série I, 1988, p. 369-372. [11] S. NICAISE, Problèmes de transmission généralisés et coefficients des singularités-cas W k+2,p, C. R. Acad. Sc. Paris, 306, Série I, 1988, p. 751-756. [12] S. NICAISE, Le laplacien sur les réseaux deux-dimensionnels polygonaux topologiques, Journal de Math. Pures et Appliquées, 67, 1988, p. 93-113. 3
[13] M. DAUGE et S. NICAISE, Oblique derivative and interface problems on polygonal domains and networks, Communications in 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, Mathematical Methods in the Applied Sciences, 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 Journal on Numerical Analysis, 28, 1991, p. 728-743. [18] S. NICAISE, Differential equations in Hilbert spaces and applications to boundary value problems in nonsmooth domains, Journal of Functional Analysis, 96, 1991, p. 195-218. [19] M. BOURLARD, M. DAUGE et S. NICAISE, Error estimates on the coefficients obtained by the singular function method, Numerical Functional Analysis and Optimization, 10, 1989, p. 1077-1113. [20] S. NICAISE, Polygonal interface problems : Higher regularity results, Communications in Partial Differential Equations, 15, 1990, p. 1475-1508. [21] S. NICAISE, Contrôlabilité exacte d un problème couplé pluri- dimensionnel, C. R. Acad. Sc. Paris, 311, Série I, 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 elements methods on polygonal domains, SIAM Journal on Numerical Analysis, 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. Sc. Paris, 315, Série I, 1992, p. 1207-1210. [24] S. NICAISE, Exact controllability of a pluridimensional coupled problem, Revista Matematica de la Universidad Complutense de Madrid, 5, 1992, 4
p. 91-135. [25] A. MAGHNOUJI et S. NICAISE, Interface problems with operators of different order on polygons, Annales de la faculté des Sciences de Toulouse, I, 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, Annali della Scuola Normale Sup. di Pisa, Série IV, 19, 1992, p. 327-361. [27] F. ALI MEHMETI et S. NICAISE, Nonlinear interaction problems, Nonlinear Analysis : Theory, methods and applications, 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, Annali della Scuola Normale Sup. di Pisa, Série IV, 20, 1993, p. 163-191. [29] S. NICAISE, The Hille-Yosida and Trotter-Kato theorems for integrated semigroups, Journal of Mathematical Analysis and its applications, 180, 1993, p. 303-316. [30] S. NICAISE, Polygonal interface problems for the biharmonic operator, Mathematical Methods in the Applied Sciences, 17, 1994, p.21-39. [31] S. NICAISE et A. M. SÄNDIG, General interface problems I, Mathematical Methods in the Applied Sciences, 17, 1994, p. 395-429. [32] S. NICAISE et A. M. SÄNDIG, General interface problems II, Mathematical Methods in the Applied Sciences, 17, 1994, p. 431-450. [33] M. S. LUBUMA et S. NICAISE, Dirichlet problems in polyhedral domains I : Regularity of the solutions, Math. Nachrichten, 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. Sc. Paris, 319, Série I, 1994, p. 1109-1114. [35] M. S. LUBUMA et S. NICAISE, Dirichlet problems in polyhedral domains II : Approximation by FEM and BEM, J. Comp. Appl. Math., 61, 1995, p. 13-27. [36] S. NICAISE, Contrôlabilité exacte frontière des problèmes de transmission avec singularités, C. R. Acad. Sc. Paris, 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. Sc. Paris, 321, 1995, p. 969-974. 5
[38] J. von BELOW et S. NICAISE, Dynamical interface transition with diffusion in ramified media, Communications in Partial Differential Equations, 21, 1996, p. 255-279. [39] S. NICAISE, Boundary exact controllability of interface problems with singularities I: Addition of the coefficients of singularities, SIAM J. on Control and Optimization, 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. Sc. Paris, 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. Sc. Paris, 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. Nachrichten, 186, 1997, p. 147-165. [43] S. NICAISE, Boundary exact controllability of interface problems with singularities II: Addition of internal controls, SIAM J. on Control and Optimization, 35, 1997, p. 585-603. [44] H. EL BOUZID et S. NICAISE, Nonconforming finite element methods and singularities in polygonal domains, Advances in Mathematical Sciences and Applications, 7, 1997, p. 935-962. [45] S. NICAISE, Regularity of the solutions of elliptic systems in polyhedral domains, Bulletin Belgium Math. Soc.-S. Stevin, 4, 1997, p. 411-429. [46] F. ALI MEHMETI et S. NICAISE, Nemetskijs operators and global existence of small solutions of semilinear evolution equations on nonsmooth domains, Communications in Partial Differential Equations, 22, 1997, p. 1559-1588. [47] M. BOURLARD et S. NICAISE, Abstract Green formula and applications to integral equations, Numerical Functional Analysis and Optimization, 18, 1997, p. 667-689. [48] A. MAGHNOUJI et S. NICAISE, Coefficients of the singularities of elliptic and parabolic problems in domains with edges, Numerical Functional Analysis and Optimization, 18, 1997, p. 805-825. [49] F. ALI MEHMETI et S. NICAISE, Non-autonomous evolution equations on nonsmooth domains, Math. Nachrichten, 192, 1998, p. 37-70. [50] Th. APEL et S. NICAISE, The finite element method with anisotropic mesh grading for elliptic problems in domains with corners and edges Mathematical Methods in the Applied Sciences, 21, 1998, p. 519-549. 6
[51] D. MERCIER et S. NICAISE, Existence results for general systems of differential equations on one-dimensional networks and prewavelets approximation, Discrete and Continuous Dynamical 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, Mathematical Methods in the Applied Sciences, 21, 1998, p. 1233-1267. [53] B. DEKONINCK et S. NICAISE, Spectre des réseaux de poutres, C.R. Acad. Sc. Paris, 326, Série I, 1998, p. 1249-1254. [54] M. COSTABEL, M. DAUGE et S. NICAISE, Singularities of Maxwell interface problems, RAIRO Modél. Math. Anal. Numér., 33, 1999, 627-649. [55] B. DEKONINCK et S. NICAISE, Control of networks of Euler-Bernoulli beams, ESAIM Control Optim. Calc. Var.,4, 1999, 57-82. [56] S. NICAISE et A.-M. SÄNDIG, Transmission problems for the Laplace and elasticity operators: Regularity and boundary integral formulation, Mathematical Models and Methods in Applied Sciences, 9, 1999, 855-898. [57] C. BOURGEOIS et S. NICAISE, Approximation par préondelettes augmentée de l équation de la plaque libre polygonale, C.R. Acad. Sc. Paris, 329, Série I, 1999, p. 727-730. [58] M. S. LUBUMA et S. NICAISE, Finite element method for elliptic problems with edge corners, J. Comp. 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. Royal Soc. Edinburgh, 130 A, 2000, 107-140. [60] S. NICAISE, Jacobi polynomials, weighted Sobolev spaces and approximation results of some singularities, Mathematische Nachrichten, 213, 2000, 117-140. [61] S. LOHRENGEL et S. NICAISE, Les équations de Maxwell dans des matériaux composites: problèmes de densité, C. R. Acad. Sci. Paris, 330, Série I, 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. Sc. Paris, 331, Série I, 2000, p. 143-148. [63] S. NICAISE et O. PENKIN, Relationship between the lower frequency spectrum of plates and networks of beams, Mathematical Methods in the Applied Sciences, 23, 2000, p. 1389-1399. [64] M. FARHLOUL, L. PAQUET et S. NICAISE, A mixed formulation of Boussinesq equations: Analysis of non-singular solutions, Mathematics of 7
Computation, 69, 2000, p. 965-986. [65] S. NICAISE, Exact boundary controllability of Maxwell s equations in heteregeneous media and an application to an inverse source problem, SIAM J. Control and Opt., 38, 2000, p. 1145-1170. [66] B. DEKONINCK et S. NICAISE, The eigenvalue problem for networks of beams, Linear Algebra and 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, Num. Functional Analysis and Optimization, 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, Advances in Mathematical Sciences and Applications, 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. Num. Analysis, 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 measurements, Mathematical Methods in the Applied Sciences, 24, 2001, p. 865-884. [72] S. NICAISE, Edge elements on anisotropic meshes and approximation of the Maxwell equations, SIAM Journal on Numerical Analysis, 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, Asymptotic Analysis, 28, 2001, p. 241-278. [74] Th. APEL, S. NICAISE et J. SCHÖBERL, Crouzeix-Raviart type finite elements on anisotropic meshes, Numer. Math., 89, 2001, p. 193-223. [75] Th. 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. Num. Analysis, 21, 2001, p. 843-856. [76] M. JUNG, S. NICAISE et J. TABKA, Some multilevel methods on graded meshes, J. Comp. Appl. Math., 138, 2002, p. 151-171. [77] S. LOHRENGEL et S. NICAISE, Maxwell s equations in composite materials: remarks on density, Communications in Partial Differential Equations, 27, 2002, p. 1575-1623. 8
[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, Quasilinear elliptic systems of second order in domains with corner singularities, ZAA, 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, Comp. and Apppl. 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, EJDE, 2002, No. 21, 2002, p. 1-26. [82] S. NICAISE, Stability and controllability of the electromagneto-elastic system, Portugaliae Mathematica, 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, Revista Matematica de la Universidad Complutense de Madrid, 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. Num. Analysis, 23, 2003, p. 331-358. [86] S. NICAISE et O. M. PENKIN, Fundamental inequalities on firmly stratified sets and some applications, J. of inequalities in pure and applied Math., 4, 2003. [87] S. NICAISE et O. ZAIR, Identifiability, stability and reconstruction results of sources by interior measurements, Portugaliae Mathematica, 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 9
methods for elliptic problems with corner singularities, J. of Finite Volumes, 1, 2004, 36 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. PDE, 29, 2004, p. 43-70. [92] S. NICAISE, Stability and controllability of an abstract evolution equation of hyperbolic type and concrete applications, Rendiconti di Matematica, Série VII, 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, RAIRO Modél. Math. Anal. Numér., 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. Acad. Sc. Paris, 338, Série I, 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, EJDE, 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, Mathematical Models and Methods in Applied Sciences, 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. Acad. Sc. Paris, Série I, 339, 2004, p. 513-518. [103] S. NICAISE et O. M. PENKIN, Solvability of the Dirichlet problem on stratified sets, J. Mathematical Sciences, 123, 2004, p. 4404-4427. 10
[104] A. HEMINNA, S. NICAISE et A. SENE, Stabilisation d un système de la thermoélasticité anisotrope avec feedbacks non linéaire, C. R. Acad. Sc. Paris, Série I, 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. Nachrichten, 278, 2005, p. 692-702. [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, Abstract Appl. Analysis, 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, Quaterly of Applied Mathematics, 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, Modél. Math. Anal. Num., 39, 2005, p. 319-348. [110] D. MERCIER et S. NICAISE, Existence, uniqueness and regularity results for piezoelectric systems, Siam J. Math. Analysis, 37, 2005, p. 651-672. [111] S. NICAISE, A posteriori error estimations of some cell-centered finite volume methods, Siam J. Numer. Analysis, 43, 2005, p. 1481-1503. [112] S. NICAISE, On Zienkiewicz Zhu error estimators for Maxwell s equations, C. R. Acad. Sc. Paris, Série I, 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. Meth. PDE, 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, ETNA, 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. Analysis, 44, 2006, 949-978. [117] S. NICAISE et C. PIGNOTTI, Internal and boundary observability estimates for heterogeneous Maxwell s system, AMO, 54, 2006, p. 47-70. [118] E. CREUSÉ et S. NICAISE, Discrete compactness for a discontinuous 11
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. Complutense, 19, 2006, p. 277-296. [120] A. MAGHNOUJI et S. NICAISE, Boundary layers for transmission 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, Computational Methods in Applied Mathematics, 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 Opt., 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, NFAO, 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, Asymptotic Analysis, 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, Comp. Meth. Applied Mechanics Eng., 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, Comp. Meth. Applied 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, Collectanea Mat. Barcelona, 58, 2007, p. 327-342. 12
[131] Th. APEL et S. NICAISE, A posteriori error estimations of a SUPG method for anisotropic diffusion-convection-reaction problems, C. R. Acad. Sc. Paris, Série I, 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, NHM, 2, 2007, p. 425-479. [133] A. AIBECHE, W. CHIKOUCHE et S. NICAISE, L p regularity of transmission problems in dihedral domains, Boll. UMI, Série B, (8) 10-B, 2007, p. 633-660. [134] P. HILD et S. NICAISE, Residual a posteriori estimators for contact problems in elasticity, M2AN Math. Model. Numer. Anal., 41, 2007, p. 897-923. [135] A. ERN, S. NICAISE et M. VOHRALIK, An accurate H(div) flux reconstruction for discontinuous Galerkin approximations of elliptic problems, C. R. Acad. Sc. Paris, Série I, 345, 2007, p. 709-712. [138] S. NICAISE et S. REPIN, Functional a posteriori error estimates for the reaction convection diffusion problem, Zapsiki Nauchn. Semin. Steklov Inst. Math. in St. Petersburg, 348, 2007, p. 127-146; J. Math. Sciences, 152, 2008, p. 690-701. [136] W. CHIKOUCHE et S. NICAISE, Regularity of the solution of some transmission problems in domains with cuspidal points, Annales de la faculté des Sciences de Toulouse, 16, 2007, p. 529-650. [137] S. NICAISE et C. PIGNOTTI, Partially delayed stabilizing feedbacks for Maxwell s system, Advances in Differential Equations, 12, 2007, p. 27-54. [139] E. CREUSÉ et S. NICAISE, A posteriori error estimations of a coupled mixed and standard Galerkin method for second order operators, J. Comput. Appl. Math., 213, 2008, p. 35-55. [140] M. FARHLOUL, S. NICAISE et L. PAQUET, Refined mixed finite element methods of the stationary Navier Stokes equations with mixed boundary conditions, IMA J. Numer. Analysis, 28, 2008, p. 25-45. [141] C. DE COSTER et S. NICAISE, Lower and upper solutions for elliptic problems in nonsmooth domains, J. Diff. Equations, 244, 2008, p. 599-629. [142] S. NICAISE et N. SOUALEM, A posteriori error estimates for a nonconforming finite element discretization of the time-dependent Stokes problem, J. Numer. Math., 15, 2007, p. 137-162. [143] S. NICAISE et N. SOUALEM, A posteriori error estimates for a nonconforming finite element discretization of the time-dependent Stokes problem 13
II: Analysis of the spatial estimator, J. Numer. Math., 15, 2007, p. 209-231. [144] K. DJADEL et S. NICAISE, A non conforming finite volume element method of weighted upstream type for the two-dimensional stationary Navier Stokes system, Appl. Num. Math., 58, 2008, p. 615-634. [145] S. NICAISE, K. WITOWSKI et B. I. WOHLMUTH, An a posteriori error estimator for the Lamé equation based on H(div)-conforming stress approximations, IMA J. Numer. Analysis, 28, 2008, p. 331-353. [146] S. NICAISE, Boundary observability of the numerical approximation of Maxwell s system in a cube, Collectanea Mat. Barcelona, 59, 2008, p. 27-52. [147] S. COCHEZ et S. NICAISE, Equilibrated error estimators for discontinuous Galerkin methods, Numer. Meth. PDE, 24, 2008, p. 1236-1252. [148] L. BOULAAJINE, S. NICAISE, L. PAQUET et RAFILIPOJAONA, Dual mixed finite element methods of the elasticity problem with Lagrange multipliers, J. Comp. Applied Math., 221, 2008, p. 234-260. [149] S. NICAISE et C. PIGNOTTI, Asymptotic analysis of a simple model of fluid-structure interaction, NHM, 3, 2008, p. 787-813. [150] W. CHIKOUCHE et S. NICAISE, Singularities of Maxwell s system in non-hilbertian Sobolev spaces, Annali della Scuola Normale Sup. di Pisa, Série V, 7, 2008, p. 455-482. [151] S. NICAISE et C. PIGNOTTI, Stabilization of the wave equation with boundary or internal distributed delay, Differential and Integral Equations, 21, 2008, p. 935-958. [152] S. MAO, S. NICAISE et Z.-C. SHI, On the interpolation error estimates for Q quadrilateral finite elements, Siam J. Numer. Analysis, 47, 2008/09, p. 556-576. [153] S. COCHEZ, S. NICAISE et S. REPIN, A posteriori error estimates for finite volume approximations, Math. Mod. Natural Phenomenon, 4, 2009, p. 106-122. [154] K. AMMARI et S. NICAISE, Polynomial and analytic stabilization of a wave equation coupled with a Euler-Bernoulli beam, Math. Methods Applied Sciences, 32, 2009, p. 556-576. [155] S. NICAISE, J. VALEIN et E. FRIDMAN, Stability of the heat and wave equations with boundary time-varying delays, Discrete and Continuous Dynamical Systems-S, 2, 2009, p. 559-581. [156] P. CORNILLEAU et S. NICAISE, Energy decay for solutions of the wave equation with general memory boundary conditions, Differential and Integral Equations, 22, 2009, p. 1173-1192. 14
[157] S. HASSANI, A. MAGHNOUJI et S. NICAISE, Limit behaviors of some boundary value problems with high and/or low valued parameters, Advances in Differential Equations, 14, 2009, p. 875-910. [158] M. FARHLOUL, S. NICAISE et L. PAQUET, A priori and a posteriori error estimations for the dual mixed finite element method of the Navier- Stokes problem, NMPDE, 25, 2009, p. 843-869. [159] S. NICAISE et C. XENOPHONTOS, Finite element methods for a singularly perturbed transmission problem, J. Numerical Math., 17, 2009, p. 245-275. [160] S. NICAISE et K. LAOUBI, Polynomial stabilization of the wave equation with Ventcel s boundary conditions, Math. Nachrichten, 283, 2010, p. 1428-1438. [161] S. NICAISE et J. VALEIN, Quasi exponential decay of a finite difference space discretization of the 1-d wave equation by pointwise interior stabilization, Advances in Computational Mathematics, 32, 2010, p. 303-334. [162] S. NICAISE et J. VALEIN, Stabilization of second order evolution equations with unbounded feedback with delay, ESAIM Control Optim. Calc. Var., 16, 2010, p. 420-456. [163] P. CIARLET, F. LEFEVRE, S. LOHRENGEL et S. NICAISE, Weighted regularization for composite materials in electromagnetism, M2AN Math. Model. Numer. Anal., 44, 2010, p. 75-108. [164] S. COCHEZ et S. NICAISE, A posteriori error estimators based on equilibrated fluxes, Computational Methods in Applied Mathematics, 10, 2010, p. 49-68. [165] M. COSTABEL, M. DAUGE et S. NICAISE, Mellin Analysis of Weighted Sobolev Spaces with Nonhomogeneous Norms on Cones, In: Around the Research of Vladimir Maz ya I. Function Spaces, pp. 105-136, Springer, 2010. (article sur invitation) [166] S. NICAISE et J. VALEIN, A remark on the stabilization of the 1-d wave equation, C. R. Acad. Sc. Paris, 348, 2010, p. 47-51. [167] S. NICAISE et S. COCHEZ, Adaptive finite element methods for elliptic problems: abstract framework and applications, M2AN Math. Model. Numer. Anal., 44 (3), 2010, p. 485-508. [168] M. AFIF, B. AMAZIANE, G. KUNERT, Z. MGHAZLI et S. NICAISE, A posteriori error estimation for a finite volume discretization on anisotropic meshes, J. Scientific Computing, 43, 2010, p. 183-200. 15
[169] I. MERABET, D. A. CHACHA et S. NICAISE, Singular layers for transmission problems in thin shallow shell theory: Rigid junction case, Comptes Rendus Mécanique, 338, 2010, p. 102-106. [170] S. MAO, S. NICAISE et Z.-C. SHI, Error estimates of Morley triangular element satisfying the maximal angle condition, Int. J. Numerical Analysis and Modeling, 7, 2010, p. 639-655. [171] K. AMMARI et S. NICAISE, Stabilization of a transmission wave/plate equation, Journal of Differential Equations, 249, 2010, p. 707-727. [172] E. CREUSÉ et S. NICAISE, A posteriori error estimator based on gradient recovery by averaging for discontinuous Galerkin methods, J. Comp. Applied Math., 234, 2010, p. 2903-2915. [173] I. MERABET, D. A. CHACHA et S. NICAISE, Singular layers for transmission problems in thin shallow shell theory: Elastic junction case, Comptes Rendus Mécanique, 338, 2010, p. 277-282. [174] K. AMMARI, S. NICAISE et C. PIGNOTTI, Feedback boundary stabilization of wave equations with interior delay, Systems and Control Letters, 59, 2010, p. 623-628. [175] E. FRIDMAN, S. NICAISE et J. VALEIN, Stabilization of Second Order Evolution Equations with Unbounded Feedback with Time-Dependent Delay, SIAM J. on Control and Optimization, 48 (8), 2010, p. 5028-5052. [176] S. NICAISE, C. PIGNOTTI et J. VALEIN, Exponential stability of the wave equation with boundary time-varying delay, Discrete and Continuous Dynamical Systems-S, 4, 2011, p. 693-722. [177] C. DE COSTER et S. NICAISE, Singular behavior of the solution of the Helmholtz equation in weighted L p -Sobolev spaces, Advances in Differential Equations, 16, 2011, p. 165-198. [178] C. DE COSTER et S. NICAISE, Singular behavior of the solution of the periodic-dirichlet heat equation in weighted L p -Sobolev spaces, Advances in Differential Equations, 16, 2011, p. 221-256. [179] S. NICAISE et C. PIGNOTTI, Interior feedback stabilization of wave equations with time dependent delay, Electron. J. Diff. Equ., 2011 (2011), No. 41, pp. 1-20. [180] M. BASSAM, D. MERCIER, S. NICAISE et A. WEHBE, Stabilisation frontière indirecte du système de Timoshenko, C. R. Acad. Sc. Paris, Sér. I, 349, 2011, p. 379-384. [181] S. NICAISE et J. VENEL, A posteriori error estimates for a finite element approximation of transmission problems with sign changing coefficients, 16
J. Comp. Applied Math., 235, 2011, p. 4272-4282. [182] S. NICAISE et D. SIRCH, Optimal control of the Stokes equations: Conforming and non-conforming finite element methods under reduced regularity, Computational Optimization and Applications, 49, 2011, p. 567-600. [183] F. LEFEVRE, S. LOHRENGEL et S. NICAISE, An extended Finite Element Method for 2D edge elements, Int. J. Numerical Analysis and Modeling, 8, 2011, p. 641-666. [184] S. NICAISE, Y. RENARD et E. CHAHINE, Optimal convergence analysis for the extended Finite Element Method, International Journal for Numerical Methods in Engineering, 86, 2011, p. 528-548. [185] C. DE COSTER et S. NICAISE, Singular behavior of the solution of the Cauchy-Dirichlet heat equation in weighted L p -Sobolev spaces, Bulletin Belgium Math. Soc.-S. Stevin, 18, 2011, p. 769-780. [186] S. NICAISE et S.-E. REBIAI, Stabilization of the Schrödinger equation with a delay term in boundary feedback or internal feedback, Portugaliae Mathematica, 68, 2011, p. 19-39. [187] K. AMMARI et S. NICAISE, Stabilization of a piezoelectric system, Asymptotic Analysis, 73 (3), 2011, p. 125-146. [188] Th. APEL, S. NICAISE et D. SIRCH, A posteriori error estimation of residual type for anisotropic diffusion convection reaction problems, J. Comp. Appl. Math., 235 (8), 2011, p. 2805-2820. [189] D. UYSTEPRUYST, M. WILLIAM-LOUIS, E. CREUSE, S. NICAISE et F. MONNOYER, Efficient 3D numerical prediction of the pressure wave generated by high-speed trains entering tunnels, Computers and Fluids, 47 (1), 2011, p. 165-177. [190] E. CREUSÉ, S. NICAISE et E. VERHILLE, Robust equilibrated a posteriori error estimators for the Reissner-Mindlin system, Calcolo, 48 (4), 2011, p. 307-335. [191] A. BENSAYAH, D. A. CHACHA et S. NICAISE, Asymptotic modelling of time-dependent Signorini problem without friction of linear thin plate, Journal of Mathematical Analysis, 1 (2), 2011, p. 28-43. [192] S. NICAISE et C. PIGNOTTI, Exponential stability of second order evolution equations with structural damping and dynamic boundary delay feedback, IMA Journal of Mathematical Control and Information, 28 (4), 2011, p. 417-553. [193] S. NICAISE, Internal stabilization of a Mindlin-Timoshenko model by interior feedbacks, Mathematical Control and Related Fields, 1 (3), 2011, p. 17
331-352. [194] D. MERCIER et S. NICAISE, Polynomial decay rate for a wave equation with weak dynamic boundary feedback laws, Journal of Abstract Differential Equations and Applications, 2 (1), 2011, p. 1-25. [195] S. NICAISE et J. VALEIN, Stabilization of non-homogeneous elastic materials with voids, Journal of Mathematical Analysis and its applications, 387, 2012, p. 1061-1087. [196] D. MERCIER et S. NICAISE, Regularity results of Stokes/Lamé interface problems, Math. Nachrichten, 285, 2012, p. 332-348. [197] E. CREUSÉ, S. NICAISE, Z. TANG, Y. LE MENACH, N. NEMITZ et F. PIRIOU, Residual-based a posteriori estimators for the A/Φ magnetodynamic harmonic formulation of the Maxwell system, Mathematical Models and Methods in Applied Sciences, 22 (5), 2012, à paraître. [198] M. COSTABEL, M. DAUGE et S. NICAISE, Analytic regularity for linear elliptic systems in polygons and polyhedra, Mathematical Models and Methods in Applied Sciences, 22 (8), 2012, à paraître. [199] E. CREUSE et S. NICAISE, A posteriori error estimator based on gradient recovery by averaging for convection-diffusion-reaction problems approximated by discontinuous Galerkin methods, IMA J. Num. Analysis, 33, 2013, p. 212-241. [200] F. ABDALLAH, S. NICAISE, J. VALEIN, et A. WEHBE, Stability results for the approximation of weakly coupled wave equations, C. R. Acad. Sc. Paris, Sér. I, 350, 2012, p. 29-34. [201] S. NICAISE, Stabilization and asymptotic behavior of dispersive medium models, Systems and Control Letters, 61, 2012, p. 638-648. [202] E. CREUSÉ, S. NICAISE, Z. TANG, Y. LE MENACH, N. NEMITZ et F. PIRIOU, Residual-based a posteriori estimators for the T/Ω magnetodynamic harmonic formulation of the Maxwell system, International Journal of Numerical Analysis and Modeling, 10 (2), 2013. 10 (2013), p. 411-429. [203] S. NICAISE et C. PIGNOTTI, Asymptotic stability of second order evolution equations with intermittent delay, ADE, 17, 2012, p. 879-902. [204] S. NICAISE, Time-domain study of the Drude Born Fedorov model for a class of heterogeneous chiral materials, Mathematical Methods in the Applied Sciences, 36 (7), 2013, p. 794-813. [205] I. MERABET, S. NICAISE et D. CHACHA, On the asymptotic behavior of transmission thin shell problems, Asymptotic Analysis, 82, 2013, p. 163-185. 18
[206] S. NICAISE et C. XENOPHONTOS, Robust approximation of singularly perturbed delay differential equations by the hp finite element method, Computational Methods in Applied Mathematics, 13, 2013, p. 21-37. [207] F. ABDALLAH, D. MERCIER et S. NICAISE, Spectral analysis and exponential or polynomial stability of some indefinite sign damped problems, Evolution Equations and Control Theory, 2, 2013, p. 1-33. [208] C. DE COSTER et S. NICAISE, Lower and upper solutions for the heat equation on a polygonal domain of R 2, Differential and Integral Equations, 26, 2013, p. 603-622. [209] K. AMMARI, S. NICAISE et C. PIGNOTTI, Stabilization by switching time delay. Asymptot. Anal., 83, 2013, p. 263-283. [210] F. ABDALLAH, S. NICAISE, J. VALEIN, et A. WEHBE, Uniformly exponentially or polynomially stable approximations for second order evolution equations and some applications, ESAIM-COCV, 19 (3), 2013, p. 844-887. [211] D. DI PIETRO et S. NICAISE, A locking-free discontinuous Galerkin method for linear elasticity in locally nearly incompressible heterogeneous media, Applied Numerical Mathematics, 63, 2013, p. 105-116 [212] Z. ABBAS et S. NICAISE, Polynomial decay rate for a wave equation with general acoustic boundary feedback laws, Sema, 61, 2013, p. 19-48. [213] Z. TANG, Y. LE MENACH, E. CREUSÉ, S. NICAISE, F. PIRIOU et N. NÉMITZ, A posteriori error estimator for harmonic A ϕ formulation, COMPEL, 32 (4), 2013, p. 1219-1229. [214] Z. TANG, Y. LE MENACH, E. CREUSÉ, S. NICAISE, F. PIRIOU et N. NÉMITZ, Residual and Equilibrated Error Estimators for Magnetostatic Problems solved by Finite Element Method, IEEE Trans on Magnetics, 49, 2013, à paraître. [215] F. ABDALLAH, D. MERCIER et S. NICAISE, Exponential stability of the wave equation on a star shaped network with indefinite sign damping, Palestinian Journal of Math, 2 (2), 2013, p. 113-143. [216] S. NICAISE et C. XENOPHONTOS, Convergence analysis of an h p Finite Element Method for singularly perturbed transmission problems in smooth domains, Numer. Meth. PDE, 29 (6), 2013, 2107-2132. [217] E. CREUSÉ, S. NICAISE et E. VERHILLE, Robust residual a posteriori error estimators for the Reissner-Mindlin eigenvalues system, J. Numer. Math., 21 (2), 2013, p. 89-134. [218] M. COSTABEL, M. DAUGE et S. NICAISE, Weighted Analytic Regu- 19
larity in Polyhedra, Computers and Mathematics with Applications, 67, 2014, p. 807-817. [219] G. BAYILLI et S. NICAISE, Stabilization of the wave equation in a polygonal domain with cracks, Revista Matemática Complutense, 27 (1), 2014, p. 259-289. [220] T. APEL, T. FLAIG et S. NICAISE, A priori error estimates for finite element methods for H (2,1) -elliptic equations, Numerical Functional Analysis and Optimization, à paraître. [221] S. NICAISE et F. TRÖLTZSCH, A coupled Maxwell integrodifferential model for magnetization processes, Math. Nachrichten, à paraître. [222] D. MUGNOLO et S. NICAISE, Diffusion processes on an interval under linear moment conditions, Semigroup Forum, à paraître. [223] E. CREUSÉ, S. NICAISE et Z. TANG, Helmholtz decomposition of vector fields with mixed boundary conditions and an application to a posteriori finite element error analysis of the Maxwell system, MMAS, à paraître. [224] K. AMMARI, E. FEIREISL et S. NICAISE, Polynomial stabilization of some dissipative hyperbolic systems, DCDS-A, à paraître. [225] D. MUGNOLO et S. NICAISE, Well-posedness and spectral properties of heat and wave equations with non-local conditions, JDE, 256, 2014, p. 2115-2151. 1.3 Actes de Colloques (avec comité de lecture) [226] S. NICAISE, Some results on spectral theory over networks applied to nerve impulse transmission, Lecture Notes in Math., 1171, Springer-Verlag, 1985, p. 532-541. [227] F. ALI MEHMETI et S. NICAISE, Some realizations of interaction problems, in: P. Clément, E. Mitidieri et B. de Pagter eds., Semigroup theory and evolution equations, Lecture Notes in Pure and Applied Mathematics, 135, Marcel Dekker, 1991, p.15-28. [228] M. DAUGE et S. NICAISE, Coefficients of the singularities on domains with conical points, Partial Differential Equations, Banach Center Publications, 27, Warszawa, 1992, p. 91-99. [229] S. NICAISE, Regularity of the weak solution of the Lamé systems, in: C. Bandle, J. Bemelmans, M. Chipot, M. Grüter et J. Saint Jean Paulin eds., Progress in Partial Differential Equations: calculus of variations, applications, Pitman Research Notes in Math. Series, 267, 1992, p. 272-284. 20
[230] S. NICAISE, Stable asymptotics for differential equations in a Hilbert space and applications to boundary value problems in domains with conical points, in: P. Clément et G. Lumer eds., Evolution Equations, Control Theory and Biomathematics, Lecture Notes in Pure and Applied Mathematics,155, Marcel Dekker, 1994, p.433-450. [231] M.S. LUBUMA et S. NICAISE, Regularity of the solutions of Dirichlet problems in polyhedral domains, in: M. Costabel, M. Dauge et S. Nicaise eds., Boundary value problems and integral equations in nonsmooth domains, Lecture Notes in Pure and Applied Mathematics, 167, Marcel Dekker, 1994, p. 171-184. [232] F. ALI MEHMETI et S. NICAISE, Characterization of iterated powers of operators in nonsmooth domains and Nemetskij s operators, in: G. Lumer, S. Nicaise and B.-W. Schulze eds., Partial Differential Equations, Mathematical Research, 82, Akademie Verlag, Berlin, 1994, p. 40-55. [233] Th. APEL et S. NICAISE, Elliptic problems in domains with edges: Anisotropic regularity and anisotropic finite element meshes, in: J. Céa, D. Chenais, G. Geymonat and J.-L. Lions eds., Partial Differential Equations and Functional Analysis, in Memory of Pierre Grisvard, Progress in Nonlinear Differential Equations and their Applications, 22, Birkhäuser, Boston, 1996, p. 18-34. [234] F. ALI MEHMETI et S. NICAISE, Banach algebras of functions on nonsmooth domains, in: R. Mennicken ed., IWOTA 95 Proceedings, Operator Theory: Advances and Applications, 102, Birkaüser Verlag, 1998,p. 11-20. [235] M. BOURLARD et S. NICAISE, Refined boudary element method for the heat equation, in: M. Bach, C. Constanda, G.C. Hsiao, A.-M. Sändig and P. Werner eds., Analysis, Numerics and applications of Differential and Integral equations, Pitman Research Notes in Math. Series, 379, Longman, 1998, p. 36-40. [236] H. EL BOUZID et S. NICAISE, Refined mixed finite element method for the Stokes problem, in: M. Bach, C. Constanda, G.C. Hsiao, A.-M. Sändig and P. Werner eds., Analysis, Numerics and applications of Differential and Integral equations, Pitman Research Notes in Math. Series, 379, Longman, 1998, p. 158-162. [237] M.S. LUBUMA et S. NICAISE, Constructive treatment of edge singularities of the Stokes problems, in: R. Salvi ed., Navier-Stokes equations: Theory and numerical methods, Pitman Research Notes in Math. Series, 21
388, Longman, 1998, p. 295-309. [238] B. DEKONINCK et S. NICAISE, The eigenvalue problem for networks of beams, in: I. Antoniou et G. Lumer eds., Generalized functions, Operator theory and dynamical systems, Research Notes in Math., 399, Chapman and Hall/CRC, 1999, p. 335-344. [239] M. FARHLOUL, L. PAQUET et S. NICAISE, A mixed formulation of Boussinesq equations: Some numerical results, Proceedings of the Seventh Conference of the CFD Society of Canada, 30 Mai-1 Juin 1999, Halifax (Canada). [240] M. BOURLARD, A. MAGHNOUJI, S. NICAISE et L. PAQUET, On the asymptotic expansion of the solution of a Dirichlet-Ventcel problem with a small parameter, in: J. von Below, F. Ali Mehmeti et S. Nicaise eds, Partial differential equations on multistructures, Lecture Notes in Pure and Applied Mathematics, 219, Marcel Dekker, 2001, p. 49-68. [241] Th. APEL, S. NICAISE et J. SCHÖBERL, Finite elements methods with anisotropic meshes near edges, in: P. Neittaansmäski and M. Krizek eds, Finite elements methods: three-dimensional problems, Gakuto Int. Ser. Math Sci. Appl., 15, Gakkotosho, 2001, p. 3-10. [242] C. BOURGEOIS et S. NICAISE, Biorthogonal wavelet approximation methods for the heat equation, in: J. Elschner, I. Gohberg and B. Silbermann eds, Problems and methods in Mathematical Physics, the S. Prossdorf memorial volume, Operator Theory: Advances and appl., 121, Birkhäuser Verlag, 2001, p. 60-72. [243] K. DJADEL, S. NICAISE et J. TABKA, Some refined finite volume methods for elliptic problems with corner singularities, in: R. Herbin and O. Kröner eds, Finite Volume for Complex Applications, Hermès, 2002, p. 729-736. [244] A. GAVRILOV, S. NICAISE et O. M. PENKIN, Poincaré s inequality on stratified sets and applications, in: M. Iannelli and G. Lumer eds, Evolution Equations: Applications to Physics, Industry, Life Sciences Economics, Progress in Nonlinear Differential Eq. and appl., 55, Birkhäuser Verlag, 2003, p. 195-213. [245] M. COSTABEL, M. DAUGE et S. NICAISE, Corner singularities of Maxwell interface and eddy current problems, in: I. Gohberg, A.F. dos Santos, F.-O. Speck, F.S. Teixeira and W. Wendland eds, Operator theoretical methods and applications to Mathematical Physics (The E. Meister memorial volume), Operator Theory: Advances and appl., 147, Birkhäuser Verlag, 22
2004, p. 241-256. [246] S. NICAISE et C. PIGNOTTI, Exponential and polynomial stability estimates for the wave equation and Maxwell s system with memory boundary conditions, in: H. Amann, W. Arendt, M. Hieber, F. Neubrander, S. Nicaise et J. von Below eds, Functional Analysis and Evolution Equations: The Günter Lumer volume, Birkhäuser Verlag, 2007, p. 515-530. [247] E. FRIDMAN, S. NICAISE et J. VALEIN, Stability of second order evolution equations with time-varying delays, IFAC Workshop on TDS 2009, Sinaya, Romania (6 pages). [248] D. UYSTEPRUYST, M. WILLIAM-LOUIS, F. MONNOYER, E. CREUSE et S. NICAISE, Three-dimensional Cartesian Method for the Simulation of Railway Tunnel Entrance, 1st International Congress on Rail Transport Technology, Saragosse, Espagne, 2010, p. 40-42. [249] Z. TANG, Y. LE MENACH, E. CREUSÉ, S. NICAISE, F. PIRIOU et N. NÉMITZ, Residual based a posteriori error estimator for harmonic A/ϕ and T/ω formulations in eddy current problems, CEFC 2012, à paraître. 1.4 Livres [250] S. NICAISE, Polygonal interface problems, Methoden und Verfahren Math. Physik, 39, Peter Lang Verlag, 1993 (250 pages). [251] M. COSTABEL, M. DAUGE et S. NICAISE éditeurs, Boundary value problems and integral equations in nonsmooth domains, Lecture Notes in Pure and Applied Mathematics, 167, Marcel Dekker, 1994 (299 pages). [252] G. LUMER, S. NICAISE et B.-W. SCHULZE éditeurs, Partial Differential Equations, Mathematical Research, 82, Akademie Verlag, Berlin, 1994 (421 pages). [253] J. von BELOW, F. ALI MEHMETI et S. NICAISE éditeurs, Partial differential equations on multistructures, Lecture Notes in Pure and Applied Mathematics, Lecture Notes in Pure and Applied Mathematics, 219, Marcel Dekker, 2001 (248 pages). [254] H. AMANN, W. ARENDT, M. HIEBER, F. NEUBRANDER, S. NICAISE et J. von BELOW éditeurs, Functional Analysis and Evolution Equations: The Günter Lumer volume, Birkhäuser Verlag, 2007 (637 pages). [255] C. BESSE, O. GOUBET, T. GOUDON et S. NICAISE éditeurs, Proceedings Canum 2008, Esaim-Proc, 27 2009 (321 pages). [256] C. DE COSTER et S. NICAISE, Introduction à quelques problèmes 23
d EDP, notes du GT de l équipe EDP, Editions universitaires européennes, à paraître (190 pages). 1.5 Actes de Séminaires ou de Colloques (sans comité de lecture) [257] S. NICAISE, Approche spectrale des problèmes de diffusion sur les réseaux, Lecture Notes in Math., 1235, Springer-Verlag, 1987, p. 120-140. [258] S. NICAISE, Problèmes de transmission généralisés et coefficients des singularités-cas W 2,p, Séminaire d E.D.P. de Nantes, 1987, p. 399-425. [259] S. NICAISE, Interface problems and coefficients of the singularities, Bull. Soc. Math. Belgique, 41, série B, 1989, p. 73-82. [260] M. BOURLARD, M.S. LUBUMA, M. DAUGE et S. NICAISE, Coefficients des singularités pour des problèmes aux limites elliptiques sur un domaine à singularités coniques III : Approximation par éléments finis dans un polygone, Séminaire d E. D. P. de Nantes, 1988, tome 1, p. 55-88. [261] F. ALI MEHMETI et S. NICAISE, Compact imbeddings and interaction problems, Proceedings of the Tübingen worshop on operator semigroups and evolution equations, Blaubeuren, 1989, Semesterbericht Functionalanalysis (Tübingen), 1990, p. 143-152. [262] F. ALI MEHMETI et S. NICAISE, Characterization of iterated powers of operators in nonsmooth domains and Nemetskij s operators, proceedings de la conférence Mathematische Probleme der Kontinuousmechanik, Darmstadt (RFA), 7-9 Octobre 1993, p. 4-6, 1994. [263] S. NICAISE et A.-M. SÄNDIG, Singularities of interface problems in non-smooth domains, proceedings de la conférence Mathematische Probleme der Kontinuousmechanik, Darmstadt (RFA), 7-9 Octobre 1993, p. 16-19, 1994. [264] S. NICAISE, Singularities in interface problems, in: L. Jentsch et F. Tröltzsch eds., Problems and Methods in Mathematical Physics, Teubner- Texte zur Math., 134, Teubner, 1994, p. 130-137. [265] S. NICAISE, Numerical treatment of boundary value problems with corner singularities, Notices of the South African Math. Soc., 30, 1999, p. 101-109. [266] S. NICAISE, Stabilization of second order evolution equations with unbounded feedback with delay, in K. Ammari eds, Collection Séminaire et 24