Spherical harmonics method for computing the image stress due to a spherical void

TL;DR

This paper introduces an efficient numerical method using spherical harmonics to compute image stress fields caused by spherical voids, improving simulation accuracy and efficiency in dislocation-void interactions.

Contribution

The paper presents a novel spherical harmonics-based approach for calculating image stress fields, offering a more efficient alternative to finite-element methods in elasticity problems.

Findings

Method achieves higher efficiency than finite-element approaches.

Complete basis functions for displacement, stress, and traction fields are derived.

Applicable to various elasticity problems involving spherical boundaries.

Abstract

We develop an efficient numerical method for calculating the image stress field induced by spherical voids in materials. The method is applied to dislocation-void interactions in dislocation dynamics simulations. We obtain a complete set of basis functions for the solution of the image stress problem, as well as their corresponding displacement, stress, and traction fields in terms of the linear combination of spherical harmonics. Using the fast transformation between the real and spherical-harmonics spaces provided by the SHTOOLS package, the method is more efficient than other image stress solvers such as the finite-element method. This method can readily be extended for solving elasticity problems involving inclusions and inhomogeneities, contact between spheres, as well as other differential equations with spherical boundaries beyond elasticity.