MATRIX GREEN’S FUNCTION OF DOUBLE-DIFFUSIVITY PROBLEM AND ITS APPLICATIONS TO PROBLEMS WITH INNER POINT SOURCE
Abstract
The matrix Green’s function of the initial-boundary value problem of admixture double-diffusivity is defined. The initial-boundary value problem with a point source is formulated for the matrix elements for determination of the matrix Green’s function. Formulae for matrix elements are obtained and the behavior of Green’s functions is investigated. It is shown that the surface generated by the Green’s function has a typical sharp peak in the vicinity of the point of action of the point mass source, and in the vicinity of the top boundary of the layer, the values of the second element of the Green’s function are times higher than the values of the first one the state of which is corresponding to the quick migration way. On this basis the solutions of the initial-boundary value problems under the action of the internal point source of mass are found. The cases of the deterministic source as well as stochastic ones under uniform and triangular distributions of the coordinate of the mass source location are considered.
Keywords:
Green’s function, double-diffusivity, initial-boundary value problem, point mass source, random coordinateDetails
- Issue
- Vol. 23 No. 1 (2019)
- Section
- Research article
- Published
- 2019-03-31
- DOI:
- https://doi.org/10.17466/tq2019/23.1/d
- Licencja:
-
This work is licensed under a Creative Commons Attribution 4.0 International License.
