Homogenization Techniques for Composite Media
Homogenization Techniques for Composite Media Lectures Delivered at the CISM International Center for Mechanical Sciences Udine, Italy, July 1–5, 1985 / [electronic resource] :
edited by Enrique Sanchez-Palencia, André Zaoui.
- online resource.
- Lecture Notes in Physics, 272 0075-8450 ; .
- Lecture Notes in Physics, 272 .
Homogenization in elasticity -- Models of plates -- Periodic plates -- Macroscopic heat conduction in a fibered body Case of highly conducting fibers at dilute concentration -- to homogenization theory -- Fluids in porous media Darcy's law -- Acoustics in elastic porous media -- Suspension of particles in a viscous fluid -- General introduction to asymptotic methods -- Boundary layers in thermal conduction and elasticity -- Layered plates in traction. Boundary layers -- Singularities in elliptic non smooth problems -- Examples of singularities in thermal conduction and elasticity -- Elastic body with defects distributed near a surface -- Averages, boundary conditions -- Linear problems -- Failure of ductile heterogeneous materials -- Elastic perfectly plastic constituents -- Linear elasticity -- A matrix-inclusion composite -- Closure assumptions -- Variational principles -- Some elementary bounds -- Dynamic problems -- Basic physical data of polycrystal plasticity -- Taylor-type modelling of polycrystal plasticity -- Self-consistent modelling of polycrystal plasticity -- Extended space distribution sensitive self-consistent schemes.
9783540477204
10.1007/3-540-17616-0 doi
Mechanics.
Classical Mechanics.
QC120-168.85 QA808.2
531
Homogenization in elasticity -- Models of plates -- Periodic plates -- Macroscopic heat conduction in a fibered body Case of highly conducting fibers at dilute concentration -- to homogenization theory -- Fluids in porous media Darcy's law -- Acoustics in elastic porous media -- Suspension of particles in a viscous fluid -- General introduction to asymptotic methods -- Boundary layers in thermal conduction and elasticity -- Layered plates in traction. Boundary layers -- Singularities in elliptic non smooth problems -- Examples of singularities in thermal conduction and elasticity -- Elastic body with defects distributed near a surface -- Averages, boundary conditions -- Linear problems -- Failure of ductile heterogeneous materials -- Elastic perfectly plastic constituents -- Linear elasticity -- A matrix-inclusion composite -- Closure assumptions -- Variational principles -- Some elementary bounds -- Dynamic problems -- Basic physical data of polycrystal plasticity -- Taylor-type modelling of polycrystal plasticity -- Self-consistent modelling of polycrystal plasticity -- Extended space distribution sensitive self-consistent schemes.
9783540477204
10.1007/3-540-17616-0 doi
Mechanics.
Classical Mechanics.
QC120-168.85 QA808.2
531