Dynamical homogenization of a transmission grating

TL;DR

This paper develops a low-frequency homogenized model for a periodic acoustic grating, simplifying its complex response into a homogeneous layer that accurately predicts scattering and spectral properties.

Contribution

It introduces a novel low-frequency approximation that replaces the grating with an equivalent homogeneous layer, enabling easier analysis of its acoustic response.

Findings

Homogeneous layer model accurately predicts scattering amplitudes.

Model reproduces spectral reflectance, transmittance, and absorptance.

Simplifies analysis of complex grating structures.

Abstract

A periodic assembly of acoustically-rigid blocks (termed 'grating'), situated between two half spaces occupied by fluid-like media, lends itself to a rigorous theoretical analysis of its response to an acoustic homogeneous plane wave. This theory gives rise to two sets of linear equations, the first for the amplitudes of the waves in the space between successive blocks, and the second for the amplitudes of the waves in the two half spaces. The first set is solved numerically to furnish reference solutions. The second set is submitted to low-frequency approximation procedure whereby the pressure fields are found to be those for a configuration in which the grating becomes a homogeneous layer of the same thickness as the height of the blocks in the grating. A simple formula is derived for the constitutive properties of this layer in terms of those of the fluid-like medium in between the blocks. The homogeneous layer model scattering amplitude transfer functions and spectral reflectance, transmittance and absorptance reproduce quite well the corresponding rigorous numerical functions of the grating over a non-negligible range of low frequencies. Due to its simplicity, the homogeneous layer model enables theoretical predictions of many of the key features of the acoustic response of the grating.