Key mathematical tools used to analyze these fields include:
Diffusion-wave fields refer to a specialized category of periodic phenomena where diffusion-related processes behave mathematically like waves. This concept, extensively developed by Andreas Mandelis in his work Diffusion-Wave Fields: Mathematical Methods and Green Functions , unifies diverse fields like heat transfer, charge-carrier transport in semiconductors, and light scattering in turbid media under a single mathematical framework. Core Mathematical Framework Diffusion-Wave Fields: Mathematical Methods and...
: Used to solve boundary-value problems across various geometries (Cartesian, cylindrical, spherical) for both infinite and finite domains. Key mathematical tools used to analyze these fields
The mathematical nature of these fields is primarily defined by the when subjected to periodic (harmonic) excitation. While standard waves (like sound or light) propagate with distinct wavefronts, diffusion waves are highly damped and "lack wavefronts," meaning they do not travel far and cannot be easily beamed. The mathematical nature of these fields is primarily
: Fourier and Laplace transformations are fundamental for converting time-domain diffusion equations into the frequency domain.