A class of models of heat transfer processes in a multilayer domain is considered. The governing equation is a nonlinear heat-transfer equation with different temperature-dependent densities and thermal coefficients in each layer. Homogeneous Neumann boundary conditions and ideal contact ones are applied. A finite difference scheme on a special uneven mesh with a second-order approximation in the case of a piecewise constant spatial step is built. This discretization leads to a pentadiagonal system of linear equations (SLEs) with a matrix which is neither diagonally dominant, nor positive definite. Two different methods for solving such a SLE are developed - diagonal dominantization and symbolic algorithms
Collocation with cubic splines is used as a method for solving Linear second order parabolic partial...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
We outline generalized separation of variables as applied to nonlinear second-order partial differen...
A class of models of heat transfer processes in a multilayer domain is considered. The governing equ...
When approximating multidimensional partial differential equations, the values of the grid functions...
The thesis commences with a description and classification of partial differential equations and the...
Numerical solution of heat transfer and fluid flow problems in two spatial dimensions is studied. An...
The nonlinear second-order parabolic equation with two variables is considered in the article. Under...
A model reduction (or lumping) technique for a class of parabolic-type partial differential equation...
This paper is concerned with finding the solutions to a particular type of partial differential equa...
Moving boundary and boundary value problems occur in many physical and engineering processes involvi...
9.1 Introduction The finite element method may be used to solve time-dependent problems as well as s...
This thesis deals with second order parabolic differential equations and some semi-Lagrangian method...
The studied nonlinear problem describes the heat conduction in nonhomogeneous and anisotropic media ...
There are well‐known numerical methods for solving the initial‐boundary value problems for partial d...
Collocation with cubic splines is used as a method for solving Linear second order parabolic partial...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
We outline generalized separation of variables as applied to nonlinear second-order partial differen...
A class of models of heat transfer processes in a multilayer domain is considered. The governing equ...
When approximating multidimensional partial differential equations, the values of the grid functions...
The thesis commences with a description and classification of partial differential equations and the...
Numerical solution of heat transfer and fluid flow problems in two spatial dimensions is studied. An...
The nonlinear second-order parabolic equation with two variables is considered in the article. Under...
A model reduction (or lumping) technique for a class of parabolic-type partial differential equation...
This paper is concerned with finding the solutions to a particular type of partial differential equa...
Moving boundary and boundary value problems occur in many physical and engineering processes involvi...
9.1 Introduction The finite element method may be used to solve time-dependent problems as well as s...
This thesis deals with second order parabolic differential equations and some semi-Lagrangian method...
The studied nonlinear problem describes the heat conduction in nonhomogeneous and anisotropic media ...
There are well‐known numerical methods for solving the initial‐boundary value problems for partial d...
Collocation with cubic splines is used as a method for solving Linear second order parabolic partial...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
We outline generalized separation of variables as applied to nonlinear second-order partial differen...