Phase transformations in solids typically lead to surprising mechanical behaviour with far reaching technological applications. The mathematical modeling of these transformations in the late 80s initiated a new field of research in applied mathematics, often referred to as mathematical materials science, with deep connections to the calculus of variations and the theory of partial differential equations. This volume gives a brief introduction to the essential physical background, in particular for shape memory alloys and a special class of polymers (nematic elastomers). Then the underlying mathematical concepts are presented with a strong emphasis on the importance of quasiconvex hulls of sets for experiments, analytical approaches, and numerical simulations.
Author(s): Georg Dolzmann (auth.)
Series: Lecture Notes in Mathematics 1803
Edition: 1
Publisher: Springer-Verlag Berlin Heidelberg
Year: 2003
Language: English
Pages: 217
Tags: Partial Differential Equations;Numerical Analysis;Mathematical Methods in Physics;Mechanics;Condensed Matter;Crystallography
1. Introduction....Pages 1-10
2. Semiconvex Hulls of Compact Sets....Pages 11-68
3. Macroscopic Energy for Nematic Elastomers....Pages 69-81
4. Uniqueness and Stability of Microstructure....Pages 83-126
5. Applications to Martensic Transformations....Pages 127-152
6. Algorithmic Aspects....Pages 153-175
7. Bibliographic Remarks....Pages 177-182
A. Convexity Conditions and Rank-one Connections....Pages 183-192
B. Elements of Crystallography....Pages 193-196
C. Notation....Pages 197-200
References....Pages 201-209
Index....Pages 211-212
