Optimal estimates and asymptotics for the stress concentration between closely located stiff inclusions

TL;DR

This paper analyzes the asymptotic behavior of stress concentration between closely located stiff inclusions, showing how the stress intensifies as the inclusions approach each other and providing methods to compute the limiting behavior.

Contribution

It establishes the exponential decay of the gradient near touching points and characterizes the limit of the stress concentration factor as inclusions become arbitrarily close.

Findings

Gradient decays exponentially near touching points

Stress concentration factor converges to a specific integral

Provides an efficient method to compute the integral

Abstract

If stiff inclusions are closely located, then the stress, which is the gradient of the solution, may become arbitrarily large as the distance between two inclusions tends to zero. In this paper we investigate the asymptotic behavior of the stress concentration factor, which is the normalized magnitude of the stress concentration, as the distance between two inclusions tends to zero. For that purpose we show that the gradient of the solution to the case when two inclusions are touching decays exponentially fast near the touching point. We also prove a similar result when two inclusions are closely located and there is no potential difference on boundaries of two inclusions. We then use these facts to show that the stress concentration factor converges to a certain integral of the solution to the touching case as the distance between two inclusions tends to zero. We then present an efficient way to compute this integral.