Physics – Condensed Matter – Materials Science
Scientific paper
2009-08-17
Physical Review B 81, 024101 (2010)
Physics
Condensed Matter
Materials Science
14 pages, 1 figure. A few minor typos in published version corrected here (in red)
Scientific paper
10.1103/PhysRevB.81.024101
The dynamic generalization of the Peierls-Nabarro equation for dislocations cores in an isotropic elastic medium is derived for screw, and edge dislocations of the `glide' and `climb' type, by means of Mura's eigenstrains method. These equations are of the integro-differential type and feature a non-local kernel in space and time. The equation for the screw differs by an instantaneous term from a previous attempt by Eshelby. Those for both types of edges involve in addition an unusual convolution with the second spatial derivative of the displacement jump. As a check, it is shown that these equations correctly reduce, in the stationary limit and for all three types of dislocations, to Weertman's equations that extend the static Peierls-Nabarro model to finite constant velocities.
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