Tags
Language
Tags
March 2024
Su Mo Tu We Th Fr Sa
25 26 27 28 29 1 2
3 4 5 6 7 8 9
10 11 12 13 14 15 16
17 18 19 20 21 22 23
24 25 26 27 28 29 30
31 1 2 3 4 5 6

Mathematical Models and Methods for Smart Materials

Posted By: alt_f4
Mathematical Models and Methods for Smart Materials

Mathematical Models and Methods for Smart Materials: Cortona, Italy, 25-29 June 2001 (Series on Advances in Mathematics for Applied Sciences) by Indam Meeting Mathematical Models for Smart Material
English | Dec. 2002 | ISBN: 9812382356 | 384 Pages | PDF | 15 MB

A collection of the papers presented at the conference on "Mathematical Models and Methods for Smart Materials", held in Italy in 2001. The papers are divided into four parts. "Methods in Materials Science" deals mainly with mathematical techniques for the investigation of physical systems, such as liquid crystals, materials with internal variables, amorphous materials, and thermoelastic materials. Also, techniques are exhibited for the analysis of stability and controllability of classical models of continuum mechanics and of dynamical systems. The second part, "Modelling of Smart Materials", is devoted to models of superfluids, superconductors, materials with memory, nonlinear elastic solids, and damaged materials. In the elaboration of the models, thermodynamic aspects play a central role in the characterization of the constitutive properties. "Well-Posedness in Materials with Memory" deals with existence, uniqueness and stability for the solution of problems, most often expressed by integrodifferential equations, which involve materials with fading memory. Also, attention is given to exponential decay in viscoelasticity, inverse problems in heat conduction with memory, and automatic control for parabolic equations. "Analytic Problems in Phase Transitions" discusses nonlinear partial differential equations associated with phase transitions, and hysteresis, possibly involving fading memory effects. Particular applications are developed for the phase-field model with memory, the Stefan problem with a Cattaneo-type equation, the hysteresis in thermo-visco-plasticity, and the solid-solid phase transition.