Characterization of the equivalent acoustic scattering for a cluster of an extremely large number of small holes

Abstract

We deal with the time-harmonic acoustic waves scattered by a large number of small holes, of maximal radius a, a<<1, arbitrary (i.e. not necessarily periodically) distributed in a bounded part of a homogeneous background. We show that as their number M grows following the law M:=M(a):=O(a-s), \; a<<1, the collection of these holes has one of the following behaviors: 1. if s<1, then the scattered fields tend to vanish as a tends to zero, i.e. the cluster is a soft one. 2. if s=1, then the cluster behaves as an equivalent medium modeled by a refraction index, supported in a given bounded domain , which is described by certain geometry properties of the holes and their local distribution. The cluster is a moderate (or intermediate) one. 3. if s>1, then the cluster behaves as a totally reflecting extended body, modeled by a bounded and smooth domain , i.e. the incident waves are totally reflected by the surface of this extended body. The cluster is a rigid one. These approximations are provided with explicit error estimates in terms of a,\; a<<1.