%0 Journal Article %D 2013 %T Fields of bounded deformation for mesoscopic dislocations %A Nicolas Van Goethem %X In this paper we discuss the consequences of the distributional approach to dislocations in terms of the mathematical properties\\r\\nof the auxiliary model fields such as displacement and displacement gradient which are obtained directly from \\r\\nthe main model field here considered as the linear strain. We show that these fields cannot be introduced rigourously without \\r\\nthe introduction of gauge fields, or equivalently, without cuts in the Riemann foliation associated to the dislocated crystal.\\r\\nIn a second step we show that the space of bounded deformations follows from the distributional approach in a natural way and \\r\\ndiscuss the reasons why it is adequate to model dislocations. The case of dislocation clusters is also addressed, as it represents an important issue in industrial crystal growth while from a mathematical point of view, peculiar phenomena might appear at the set of accumulation points. \\r\\nThe elastic-plastic decomposition of the strain within this approach is also given a precise meaning. %I SISSA %G en %U http://hdl.handle.net/1963/6378 %1 6311 %2 Mathematics %4 1 %# MAT/05 ANALISI MATEMATICA %$ Submitted by Nicolas Van Goethem (vangoeth@sissa.it) on 2013-01-14T21:21:32Z\\nNo. of bitstreams: 1\\nFBDMD.pdf: 330187 bytes, checksum: 50e746906921ab10755a58da683b979d (MD5)