Geometrical issues in the continuum mechanics of solid crystals

Nicks, Rachel; Parry, Gareth P.

Geometrical issues in the continuum mechanics of solid crystals

Nicks, Rachel; Parry, Gareth P.

Authors

RACHEL NICKS Rachel.Nicks@nottingham.ac.uk
Assistant Professor

Gareth P. Parry

Abstract

We shall outline geometrical and algebraic ideas which appear to lie at the foundation of the theory of defective crystals that was introduced by Davini [5] in 1986. The focus of the paper will be on the connection between continuous and discrete models of such crystals, approached by consideration of the symmetries inherent in these models. To begin with, we review briefy the results of analysis of variational problems where relevant functionals have the symmetry of perfect (as opposed to defective) crystals, in order to motivate the subsequent study of symmetry in the case when defects are present. In the body of the paper we indicate how the theory of Lie groups, and their discrete subgroups, relates to this geometrical theory of defects, and discuss types of symmetry that occur.

Citation

Nicks, R., & Parry, G. P. Geometrical issues in the continuum mechanics of solid crystals. Miskolc Mathematical Notes,

Journal Article Type	Article
Deposit Date	Oct 17, 2014
Journal	Miskolc Mathematical Notes
Print ISSN	1787-2405
Electronic ISSN	1787-2413
Publisher	Miskolci Egyetemi Kiadó
Peer Reviewed	Peer Reviewed
Public URL	https://nottingham-repository.worktribe.com/output/999417
Publisher URL	http://mat76.mat.uni-miskolc.hu/~mnotes/index.php
Additional Information	The final publication is available at http://mat76.mat.uni-miskolc.hu/~mnotes/index.php