Abstract
Abstract The equilibrium positions of dislocations in a number of types of array have been found numerically. Arrays considered are: a. that generated by a dislocation source which is between two locked dislocations,b. a dislocation pile-up against a locked dislocation which iR not on the slip-plane,c. a group of positive dislocations attracted to a group of negative dislocations but prevented from coalescing by locked dislocations,d. a group of positive dislocations attracted by a group of negative dislocations on a parallel slip plane. A short table of the zeros of the first derivative of the Laguerre polynomials is given.
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