Inria | Raweb 2014 | Presentation of the Team MEPHYSTO | MEPHYSTO Web Site


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Bibliography

Major publications by the team in recent years

1R. Alicandro, M. Cicalese, A. Gloria.
Integral representation results for energies defined on stochastic lattices and application to nonlinear elasticity, in: Arch. Ration. Mech. Anal., 2011, vol. 200, n^o 3, pp. 881–943.
2A. Gloria.
Reduction of the resonance error - Part 1: Approximation of homogenized coefficients, in: Math. Models Methods Appl. Sci., 2011, vol. 21, n^o 8, pp. 1601–1630.
3A. Gloria.
Numerical homogenization: survey, new results, and perspectives, in: Esaim. Proc., 2012, vol. 37, Mathematical and numerical approaches for multiscale problem.
4A. Gloria, F. Otto.
An optimal variance estimate in stochastic homogenization of discrete elliptic equations, in: Ann. Probab., 2011, vol. 39, n^o 3, pp. 779–856.
5A. Gloria, F. Otto.
An optimal error estimate in stochastic homogenization of discrete elliptic equations, in: Ann. Appl. Probab., 2012, vol. 22, n^o 1, pp. 1–28.
6A. Gloria, M. Penrose.
Random parking, Euclidean functionals, and rubber elasticity, in: Comm. Math. Physics, 2013, vol. 321, n^o 1, pp. 1–31.

Publications of the year

Articles in International Peer-Reviewed Journals

7M. Bessemoulin-Chatard, C. Chainais-Hillairet, F. Filbet.
On discrete functional inequalities for some finite volume schemes, in: IMA Journal of Numerical Analysis, July 2014, pp. 10-32. [ DOI : 10.1093/imanum/dru032 ]
https://hal.archives-ouvertes.fr/hal-00672591
8M. Bessemoulin-Chatard, C. Chainais-Hillairet, M.-H. Vignal.
Study of a fully implicit scheme for the drift-diffusion system. Asymptotic behavior in the quasi-neutral limit, in: SIAM Journal on Numerical Analysis, 2014, vol. 52, n^o 4, pp. 1666–1691.
https://hal.archives-ouvertes.fr/hal-00801912
9C.-H. Bruneau, E. Creusé, P. Gilliéron, I. Mortazavi.
Effect of the vortex dynamics on the drag coefficient of a square back Ahmed body : Application to the flow control, in: European Journal of Mechanics - B/Fluids, 2014, pp. 1-11.
https://hal.archives-ouvertes.fr/hal-01091585
10C. Chainais-Hillairet, S. Krell, A. Mouton.
Convergence analysis of a DDFV scheme for a system describing miscible fluid flows in porous media, in: Numerical Methods for Partial Differential Equations, August 2014, 38 p. [ DOI : 10.1002/num.21913 ]
https://hal.archives-ouvertes.fr/hal-00929823
11D. Cohen, G. Dujardin.
Energy-preserving integrators for stochastic Poisson systems, in: Communications in Mathematical Sciences, 2014, vol. 12, n^o 8, 17 p.
https://hal.archives-ouvertes.fr/hal-00907890
12A.- C. Egloffe, A. Gloria, J.-C. Mourrat, T. N. Nguyen.
Random walk in random environment, corrector equation and homogenized coefficients: from theory to numerics, back and forth, in: IMA Journal of Numerical Analysis, 2014, 44 p. [ DOI : 10.1093/imanum/dru010 ]
https://hal.inria.fr/hal-00749667
13A. Gloria.
When are increment-stationary random point sets stationary?, in: Electronic Communications in Probability, May 2014, vol. 19, n^o 30, pp. 1-14. [ DOI : 10.1214/ECP.v19-3288 ]
https://hal.inria.fr/hal-00863414
14A. Gloria, Z. Habibi.
Reduction of the resonance error in numerical homogenisation II: correctors and extrapolation, in: Foundations of Computational Mathematics, 2015, 67 p.
https://hal.inria.fr/hal-00933234
15A. Gloria, P. Le Tallec, M. Vidrascu.
Foundation, analysis, and numerical investigation of a variational network-based model for rubber, in: Continuum Mechanics and Thermodynamics, 2014, vol. 26, n^o 1, pp. 1–31. [ DOI : 10.1007/s00161-012-0281-6 ]
https://hal.archives-ouvertes.fr/hal-00673406
16A. Gloria, S. Neukamm, F. Otto.
An optimal quantitative two-scale expansion in stochastic homogenization of discrete elliptic equations, in: ESAIM: Mathematical Modelling and Numerical Analysis, January 2014, vol. 48, n^o 2, pp. 325-346. [ DOI : 10.1051/m2an/2013110 ]
https://hal.inria.fr/hal-00863488
17A. Gloria, S. Neukamm, F. Otto.
Quantification of ergodicity in stochastic homogenization: optimal bounds via spectral gap on Glauber dynamics, in: Inventiones Mathematicae, 2015, 61 p. [ DOI : 10.1007/s00222-014-0518-z ]
https://hal.archives-ouvertes.fr/hal-01093405
18V. Gudmundsson, S. Hauksson, A. Johnsen, G. Reinisch, A. Manolescu, C. Besse, G. Dujardin.
Excitation of radial collective modes in a quantum dot: Beyond linear response, in: Annalen der Physik, 2014, vol. 526, n^o 5-6, 12 pages with 16 included pdf figures. [ DOI : 10.1002/andp.201400048 ]
https://hal.archives-ouvertes.fr/hal-00907845
19I. Lacroix-Violet, C. Chainais-Hillairet.
On the existence of solutions for a drift-diffusion system arising in corrosion modelling, in: Discrete and Continuous Dynamical Systems - Series B, 2015, vol. Volume 20, n^o Issue 1, 15 p.
https://hal.archives-ouvertes.fr/hal-00764239
20Z. Tang, P. Dular, Y. Le Menach, E. Creusé, F. Piriou.
Comparison of residual and hierarchical finite element error estimators in eddy current problems, in: IEEE Transactions on Magnetics, 2014, vol. 50, n^o 2, 7012304.
https://hal.archives-ouvertes.fr/hal-01091577

Other Publications

21C. Calgaro, E. Creusé, T. Goudon.
Modeling and Simulation of Mixture Flows : Application to Powder-Snow Avalanches, October 2014, 48 p.
https://hal.archives-ouvertes.fr/hal-00732112
22V. Calvez, T. Gallouët.
Particle approximation of the one dimensional Keller-Segel equation, stability and rigidity of the blow-up, March 2014.
https://hal.inria.fr/hal-00968347
23C. Chainais-Hillairet, P.-L. Colin, I. Lacroix-Violet.
Convergence of a Finite Volume Scheme for a Corrosion Model, September 2014. [ DOI : 10.1007/978-3-319-05591-6_54 ]
https://hal.archives-ouvertes.fr/hal-01082041
24S. De Bievre, F. Genoud, S. R. Nodari.
Orbital stability: analysis meets geometry, July 2014.
https://hal.archives-ouvertes.fr/hal-01028168
25M. De Buhan, A. Gloria, P. Le Tallec, M. Vidrascu.
Reconstruction of a constitutive law for rubber from in silico experiments using Ogden's laws, January 2014.
https://hal.inria.fr/hal-00933240
26A. Figalli, T. Gallouët, L. Rifford.
On the convexity of injectivity domains on nonfocal manifolds, March 2014.
https://hal.inria.fr/hal-00968354
27M. Gisclon, I. Lacroix-Violet.
About the barotropic compressible quantum Navier-Stokes equations, December 2014.
https://hal.archives-ouvertes.fr/hal-01090191
28A. Gloria, D. Marahrens.
Annealed estimates on the Green functions and uncertainty quantification, September 2014, 43 pages.
https://hal.archives-ouvertes.fr/hal-01093386
29A. Gloria, S. Neukamm, F. Otto.
A regularity theory for random elliptic operators, September 2014.
https://hal.archives-ouvertes.fr/hal-01093368
30A. Gloria, J. Nolen.
A quantitative central limit theorem for the effective conductance on the discrete torus, October 2014.
https://hal.archives-ouvertes.fr/hal-01093352
31A. Gloria, F. Otto.
Quantitative estimates on the periodic approximation of the corrector in stochastic homogenization, September 2014.
https://hal.inria.fr/hal-01060499
32A. Gloria, F. Otto.
Quantitative results on the corrector equation in stochastic homogenization, September 2014, 57 pages, 1 figure.
https://hal.archives-ouvertes.fr/hal-01093381
33A. Gloria, F. Otto.
Quantitative theory in stochastic homogenization, January 2014.
https://hal.inria.fr/hal-00933251
34E. Soret, S. De Bièvre.
Stochastic acceleration in a random time-dependent potential, September 2014.
https://hal.archives-ouvertes.fr/hal-01061294

References in notes

35G. Agrawal.
Nonlinear fiber optics, Academic Press, 2006.
36B. Aguer, S. De Bièvre.
On (in)elastic non-dissipative Lorentz gases and the (in)stability of classical pulsed and kicked rotors, in: J. Phys. A, 2010, vol. 43, 474001.
37T. Arbogast.
Numerical subgrid upscaling of two-phase flow in porous media, in: Numerical treatment of multiphase flows in porous media (Beijing, 1999), Berlin, Lecture Notes in Phys., Springer, 2000, vol. 552, pp. 35–49.
38S. N. Armstrong, C. K. Smart.
Quantitative stochastic homogenization of convex integral functionals, in: ArXiv e-prints, June 2014.
39M. Avellaneda, F.-H. Lin.
Compactness methods in the theory of homogenization, in: Comm. Pure and Applied Math., 1987, vol. 40, n^o 6, pp. 803–847.
http://dx.doi.org/10.1002/cpa.3160400607
40J. M. Ball.
Some open problems in elasticity, in: Geometry, mechanics, and dynamics, New York, Springer, 2002, pp. 3–59.
41A. Braides.
Homogenization of some almost periodic functionals, in: Rend. Accad. Naz. Sci. XL, 1985, vol. 103, pp. 261–281.
42G. Dal Maso, L. Modica.
Nonlinear stochastic homogenization and ergodic theory, in: J. Reine Angew. Math., 1986, vol. 368, pp. 28–42.
43S. De Bièvre, G. Forni.
Transport properties of kicked and quasiperiodic Hamiltonians, in: J. Statist. Phys., 2010, vol. 90, n^o 5-6, pp. 1201–1223.
44M. Disertori, W. Kirsch, A. Klein, F. Klopp, V. Rivasseau.
Random Schrödinger operators, Panoramas et Synthèses, Société Mathématique de France, Paris, 2008, n^o 25.
45Y. Efendiev, T. Hou.
Multiscale finite element methods, Surveys and Tutorials in the Applied Mathematical Sciences, Springer, New York, 2009, vol. 4, Theory and applications.
46P. Flory.
Statistical mechanics of chain molecules, Interscience Publishers, New York, 1969.
47J.-C. Garreau, B. Vermersch.
Spectral description of the dynamics of ultracold interacting bosons in disordered lattices, in: New. J. Phys., 2013, vol. 15, 045030.
48A. Gloria, J.-C. Mourrat.
Spectral measure and approximation of homogenized coefficients, in: Probab. Theory. Relat. Fields, 2012, vol. 154, n^o 1, pp. 287-326.
49T. Hou, X. Wu.
A Multiscale Finite Element Method for Elliptic Problems in Composite Materials and Porous Media, in: J. Comput. Phys., 1997, vol. 134, pp. 169–189.
50S. Kozlov.
The averaging of random operators, in: Mat. Sb. (N.S.), 1979, vol. 109(151), n^o 2, pp. 188–202, 327.
51D. Marahrens, F. Otto.
Annealed estimates on the Green's function, 2013, MPI Preprint 69/2012.
52S. Müller.
Homogenization of nonconvex integral functionals and cellular elastic materials, in: Arch. Rat. Mech. Anal., 1987, vol. 99, pp. 189–212.
53A. Naddaf, T. Spencer.
Estimates on the variance of some homogenization problems, Preprint, 1998.
54G. Papanicolaou, S. Varadhan.
Boundary value problems with rapidly oscillating random coefficients, in: Random fields, Vol. I, II (Esztergom, 1979), Amsterdam, Colloq. Math. Soc. János Bolyai, North-Holland, 1981, vol. 27, pp. 835–873.
55C. Sulem, P.-L. Sulem.
The nonlinear Schrödinger equation, Springer-Verlag, New-York, 1999.
56L. Treloar.
The Physics of Rubber Elasticity, Oxford at the Clarendon Press, Oxford, 1949.
57E. Weinan.
Principles of multiscale modeling, Cambridge University Press, Cambridge, 2011, xviii+466 p.

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