We consider the conductivity problem in an array structure with square closely spaced absolutely conductive inclusions of the high concentration, i.e. the concentration of inclusions is assumed to be close to 1. The problem depends on two small parameters: epsilon, the ratio of the period of the micro-structure to the characteristic macroscopic size, and delta, the ratio oft h e thickness of the strips of the array structure and the period of the microstructure. The complete asymptotic expansion of the solution to problem is constructed and justified as both epsilon and delta tend to zero. This asymptotic expansion is uniform with respect to epsilon and delta in the area {epsilon = O(delta(alpha)), delta = O(epsilon(beta))} for any positive alpha, beta.
Asymptotic analysis of an array of closely spaced absolutely conductive inclusions
Cardone G;
2006-01-01
Abstract
We consider the conductivity problem in an array structure with square closely spaced absolutely conductive inclusions of the high concentration, i.e. the concentration of inclusions is assumed to be close to 1. The problem depends on two small parameters: epsilon, the ratio of the period of the micro-structure to the characteristic macroscopic size, and delta, the ratio oft h e thickness of the strips of the array structure and the period of the microstructure. The complete asymptotic expansion of the solution to problem is constructed and justified as both epsilon and delta tend to zero. This asymptotic expansion is uniform with respect to epsilon and delta in the area {epsilon = O(delta(alpha)), delta = O(epsilon(beta))} for any positive alpha, beta.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
