Articles dans des revues avec comité de lecture (58)
  1. 36. Gloria, A., & Mourrat, J.-C. (2013). A quantitative version of the Kipnis-Varadhan theorem and Monte-Carlo approximation of homogenized coefficients. theAnnals of applied probability/the, 23(4), 1544-1583.
  2. 37. Gloria, A. (2013). Fluctuation of solutions to linear elliptic equations with noisy diffusion coefficients. Communications in partial differential equations, 38(2), 304-338. doi:10.1080/03605302.2012.715319
  3. 38. Gloria, A., Le Tallec, P., & Vidrascu, M. (2013). Foundation, analysis, and numerical investigation of a variational network-based model for rubber. Continuum mechanics and thermodynamics., 10.1007/s00161-012-0281-6. doi:10.1007/s00161-012-0281-6
  4. 39. Gloria, A., Goudon, T., & Krell, S. (2013). Numerical homogenization of a nonlinearly coupled elliptic-parabolic system, reduced basis method, and application to nuclear waste storage. Mathematical models and methods in applied sciences, 23(13), 2523-2560.
  5. 40. Gloria, A., & Mourrat, J.-C. (2012). Spectral measure and approximation of homogenized coefficients. Probability theory and related fields, 154(1-2), 287-326. doi:10.1007/s00440-011-0370-7
  6. 41. Gloria, A., & Otto, F. (2012). An optimal error estimate in stochastic homogenization of discrete elliptic equations. theAnnals of applied probability/the, 22(1), 1-28. doi:10.1214/10-AAP745
  7. 42. Gloria, A. (2012). Numerical homogenization: survey, new results, and perspectives. ESAIM. Proceedings, 37.
  8. 43. Gloria, A. (2012). Numerical approximation of effective coefficients in stochastic homogenization of discrete elliptic equations. Modélisation mathématique et analyse numérique, 46(1), 1-38. doi:10.1051/m2an/2011018
  9. 44. Gloria, A., & Neukamm, S. (2011). Commutability of homogenization and linearization at identity in finite elasticity and applications. Annales de l'Institut Henri Poincaré. Analyse non linéaire, 28(6), 941-964. doi:10.1016/j.anihpc.2011.07.002
  10. 45. Gloria, A., & Otto, F. (2011). An optimal variance estimate in stochastic homogenization of discrete elliptic equations. Annals of probability, 39(3), 779-856. doi:10.1214/10-AOP571
  11. 46. Alicandro, R., Cicalese, M., & Gloria, A. (2011). Integral representation results for energies defined on stochastic lattices and application to nonlinear elasticity. Archive for rational mechanics and analysis, 200(3), 881-943. doi:10.1007/s00205-010-0378-7
  12. 47. Coulombel, J.-F., & Gloria, A. (2011). Semigroup stability of finite difference schemes for multidimensional hyperbolic initial-boundary value problems. Mathematics of computation, 80(273), 165-203. doi:10.1090/S0025-5718-10-02368-9
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