Characterization of two-scale gradient Young measures and application to homogenization
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Publication:2480792
DOI10.1007/s00245-007-9012-yzbMath1138.49018arXivmath/0611313OpenAlexW2078384306MaRDI QIDQ2480792
Jean-François Babadjian, Margarida Baía, Pedro Miguel Santos
Publication date: 3 April 2008
Published in: Applied Mathematics and Optimization (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0611313
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- Multiscale Young measures in almost periodic homogenization and applications
- From micro to macroenergy through Young measures
- Convergence of approximate solutions to conservation laws
- Variational methods for elastic crystals
- Fine phase mixtures as minimizers of energy
- Homogenization of nonconvex integral functionals and cellular elastic materials
- Equilibrium configurations of crystals
- Characterizations of Young measures generated by gradients
- Periodic solutions and homogenization of non linear variational problems
- Gradient Young measures generated by sequences in Sobolev spaces
- Parametrized measures and variational principles
- Quasiconvexification in 3-D for a variational reformulation of an optimal design problem in conductivity
- Loss of polyconvexity by homogenization: a new example
- 3D-2D Asymptotic Analysis for Inhomogeneous Thin Films
- Vector variational problems and applications to optimal design
- Homogenization of periodic nonconvex integral functionals in terms of Young measures
- The limit behavior of a family of variational multiscale problems
- Homogenization and Two-Scale Convergence
- Homogenization of linear and nonlinear transport equations
- A General Convergence Result for a Functional Related to the Theory of Homogenization
- Approximation of Young measures by functions and application to a problem of optimal design for plates with variable thickness
- Analysis of Concentration and Oscillation Effects Generated by Gradients
- A new approach to variational problems with multiple scales
- Multi-scale Young measures
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