Interaction of an acoustical quasi-Gaussian beam with a rigid sphere: linear axial scattering, instantaneous and time-averaged radiation force

TL;DR

This paper analyzes the interaction of a quasi-Gaussian acoustic beam with a rigid sphere, focusing on scattering and radiation forces, providing formulations, numerical results, and potential applications in transducer calibration.

Contribution

It introduces specialized formulations for scattering and force functions of a quasi-Gaussian beam interacting with a sphere, extending to various sphere types and aiding transducer calibration.

Findings

Significant differences from plane wave limit when kw0 < 25

Radiation force function useful for calibrating high-frequency transducers

Theoretical framework extendable to elastic, viscoelastic, and coated spheres

Abstract

This work focuses on the interaction of an acoustical quasi-Gaussian beam centered on a rigid immovable sphere, during which at least three physical phenomena arise, namely, the (axial) acoustic scattering, the instantaneous force, and the time-average radiation force which are investigated here. The quasi-Gaussian beam is an exact solution of the source free Helmholtz wave equation and is characterized by an arbitrary waist w0 and a diffraction convergence length known as the Rayleigh range z_R. Specialized formulations for the scattering and the instantaneous force function as well as the (time-averaged) radiation force function are provided. Numerical computations illustrate the variations of the backscattering form-function, the instantaneous force function and the (time-averaged) radiation force function versus the dimensionless frequency ka (where k is the wave number and a is the radius of the sphere), and the results show significant differences from the plane wave limit when the dimensionless beam waist parameter kw0 < 25. The radiation force function may be used to calibrate high-frequency transducers operating with this type of beam. Furthermore, the theoretical analysis can be readily extended to the case of other types of spheres (i.e. elastic, viscoelastic, shells, coated spheres and shells) providing that their appropriate scattering coefficients are used.