In this paper we provide a Liouville type theorem in the framework of fracture mechanics, and more precisely in the theory of SBV deformations for cracked bodies. We prove the following rigidity result: if u is an element of SBV(Omega, R-N) is a deformation of Omega whose associated crack J(u) has finite energy in the sense of Griffith's theory (i.e., HN-1 (J(u)) < infinity), and whose approximate gradient Vu is almost everywhere a rotation, then u is a collection of an at most countable family of rigid motions. In other words, the cracked body does not store elastic energy if and only if all its connected components are deformed through rigid motions. In particular, global rigidity can fail only if the crack disconnects the body. (c) 2006 Elsevier Inc. All rights reserved.
Piecewise rigidity / Antonin, Chambolle; Alessandro, Giacomini; Ponsiglione, Marcello. - In: JOURNAL OF FUNCTIONAL ANALYSIS. - ISSN 0022-1236. - STAMPA. - 244:1(2007), pp. 134-153. [10.1016/j.jfa.2006.11.006]
Piecewise rigidity
PONSIGLIONE, Marcello
2007
Abstract
In this paper we provide a Liouville type theorem in the framework of fracture mechanics, and more precisely in the theory of SBV deformations for cracked bodies. We prove the following rigidity result: if u is an element of SBV(Omega, R-N) is a deformation of Omega whose associated crack J(u) has finite energy in the sense of Griffith's theory (i.e., HN-1 (J(u)) < infinity), and whose approximate gradient Vu is almost everywhere a rotation, then u is a collection of an at most countable family of rigid motions. In other words, the cracked body does not store elastic energy if and only if all its connected components are deformed through rigid motions. In particular, global rigidity can fail only if the crack disconnects the body. (c) 2006 Elsevier Inc. All rights reserved.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
