In possible connection with dislocation pinning by foreign atoms in alloys and vortex pinning in type II superconductors, we compute the external force required to drag an elastic string along a discrete two-dimensional random array with finite dimensions. The obstacles, with a maximum pinning force f (m) are distributed randomly on a rectangular lattice with square symmetry. The system dimensions are fixed by the total course of the elastic string L (x) and the string length L (y) . Our study shows that Larkin's length is larger than L (y) when f (m) is less than a certain bound depending on the system size as well as on the obstacle density c (s) . Below such a bound an analytical theory is developed to compute the depinning threshold. Some numerical simulations allow us to demonstrate the accuracy of the theory for an obstacle density ranging from 1 to 50% and for different geometries.

• 出版日期2009-11
• 单位中国地震局