Publications by authors named "Vito G Daniele"
The generalized Wiener-Hopf equations for the elastic wave motion in angular regions.
Proc Math Phys Eng Sci
January 2022
Article Synopsis
- The study presents a new method to derive generalized Wiener-Hopf equations (GWHEs) for wave motion in elastic materials located in angular regions, addressing scenarios where sources are infinitely localized.
- The approach is inspired by techniques used in electromagnetism and aims to fully develop a theoretical framework for GWHEs specific to elasticity.
- A first-order vector differential equation with a matrix dependent on the medium is introduced, allowing for easy derivation of functional equations and their application to practical boundary condition problems, particularly in elastic scattering.
Article Synopsis
- Network modeling in electromagnetics utilizes the Generalized Wiener-Hopf Technique to effectively tackle scattering problems involving complex structures and geometric shapes.
- This paper aims to establish a theoretical foundation and a systematic approach for addressing intricate scattering issues through network representation, particularly in angular regions.
- The proposed methodology's effectiveness is validated through practical applications in engineering, including GTD/UTD diffraction coefficients and total far fields, and it also holds potential for use in other fields of physics.