Add to ORKGWe consider the heat equation with spatially variable thermal conductivity and homogeneous Dirichlet boundary conditions. Using the Method of Fokas or Unified Transform Method, we derive solution representations as the limit of solutions of constant-coefficient interface problems where the number of subdomains and interfaces becomes unbounded. This produces an explicit representation of the solution, from which we can compute the solution and determine its properties. Using this solution expression, we can find the eigenvalues of the corresponding variable-coefficient eigenvalue problem as roots of a transcendental function. We can write the eigenfunctions explicitly in terms of the eigenvalues. The heat equation is the first example of mor...
In this article, for the first time, the first boundary value problem for the equation of thermal co...
Computer codes are widely used to predict heat transfer fields. Modeling is accomplished in multidim...
In fact, the heat equation with Dirichlet boundary conditions has analytical solutions for a number ...
It has long been known that certain integral transforms and Fourier-type series can be used to solve...
It has long been known that certain integral transforms and Fourier-type series can be used to solve...
This paper is concerning with the 1-D initial–boundary value problem for the hyperbolic heat conduct...
summary:We are interested in the discretization of the heat equation with a diffusion coefficient de...
summary:We are interested in the discretization of the heat equation with a diffusion coefficient de...
Let L be the length of a rod and u(x,t) be its temperature for [0,L]X[0,infinity) and assume the in...
The separation of variables (SOV) method has recently been applied to solve time-dependent heat cond...
AbstractWe develop an alternative approach to the construction of explicit solutions for linear cons...
Nonhomogeneous heat-conduction equation transformation into discrete spectrum eigenvalue for
An optimal finite-dimensional modeling technique is presented for a standard class of distributed pa...
AbstractIn this paper, we consider the one-dimensional heat conduction equation on the interval [0, ...
The Heat Equation is a partial differential equation that describes the distribution of heat over a ...
In this article, for the first time, the first boundary value problem for the equation of thermal co...
Computer codes are widely used to predict heat transfer fields. Modeling is accomplished in multidim...
In fact, the heat equation with Dirichlet boundary conditions has analytical solutions for a number ...
It has long been known that certain integral transforms and Fourier-type series can be used to solve...
It has long been known that certain integral transforms and Fourier-type series can be used to solve...
This paper is concerning with the 1-D initial–boundary value problem for the hyperbolic heat conduct...
summary:We are interested in the discretization of the heat equation with a diffusion coefficient de...
summary:We are interested in the discretization of the heat equation with a diffusion coefficient de...
Let L be the length of a rod and u(x,t) be its temperature for [0,L]X[0,infinity) and assume the in...
The separation of variables (SOV) method has recently been applied to solve time-dependent heat cond...
AbstractWe develop an alternative approach to the construction of explicit solutions for linear cons...
Nonhomogeneous heat-conduction equation transformation into discrete spectrum eigenvalue for
An optimal finite-dimensional modeling technique is presented for a standard class of distributed pa...
AbstractIn this paper, we consider the one-dimensional heat conduction equation on the interval [0, ...
The Heat Equation is a partial differential equation that describes the distribution of heat over a ...
In this article, for the first time, the first boundary value problem for the equation of thermal co...
Computer codes are widely used to predict heat transfer fields. Modeling is accomplished in multidim...
In fact, the heat equation with Dirichlet boundary conditions has analytical solutions for a number ...