AbstractMany problems in applied mathematics, physics, and engineering require the solution of the heat equation in unbounded domains. Integral equation methods are particularly appropriate in this setting for several reasons: they are unconditionally stable, they are insensitive to the complexity of the geometry, and they do not require the artificial truncation of the computational domain as do finite difference and finite element techniques. Methods of this type, however, have not become widespread due to the high cost of evaluating heat potentials. When mpoints are used in the discretization of the initial data, Mpoints are used in the discretization of the boundary, and Ntime steps are computed, an amount of work of the order O(N2M2+NM...
AbstractWe present an efficient integral equation approach to solve the forced heat equation, ut(x)−...
Many problems of fundamental and practical importance in science and engineering are naturally set ...
We consider the numerical solution by finite difference methods of the heat equation in one space di...
Boundary integral formulations of the heat equation involve time con-volutions in addition to surfac...
A Nyström method for the discretization of thermal layer potentials is proposed and analyzed. The m...
Numerical methods for solving the heat equation via potential theory have been hampered by the high ...
International audienceWe describe a fast solver for the inhomogeneous heat equation in free space, f...
Numerical methods for solving the heat equation via potential theory have been ham-pered by the high...
In this paper we study the heat and advection equation in single and multiple domains. We discretize...
summary:The Fourier problem on planar domains with time variable boundary is considered using integr...
The object of this paper is to study some boundary element methods for the heat equation. Two approa...
The heart of the book is the development of a short-time asymptotic expansion for the heat kernel. T...
Heat distribution is reflected by the temperature distribution in the body. The form of heat kernel...
A convolution type exact/transparent boundary condition is proposed for simulating a semi-discretize...
We study some convergence issues for a recent approach to the problem of transparent boundary condit...
AbstractWe present an efficient integral equation approach to solve the forced heat equation, ut(x)−...
Many problems of fundamental and practical importance in science and engineering are naturally set ...
We consider the numerical solution by finite difference methods of the heat equation in one space di...
Boundary integral formulations of the heat equation involve time con-volutions in addition to surfac...
A Nyström method for the discretization of thermal layer potentials is proposed and analyzed. The m...
Numerical methods for solving the heat equation via potential theory have been hampered by the high ...
International audienceWe describe a fast solver for the inhomogeneous heat equation in free space, f...
Numerical methods for solving the heat equation via potential theory have been ham-pered by the high...
In this paper we study the heat and advection equation in single and multiple domains. We discretize...
summary:The Fourier problem on planar domains with time variable boundary is considered using integr...
The object of this paper is to study some boundary element methods for the heat equation. Two approa...
The heart of the book is the development of a short-time asymptotic expansion for the heat kernel. T...
Heat distribution is reflected by the temperature distribution in the body. The form of heat kernel...
A convolution type exact/transparent boundary condition is proposed for simulating a semi-discretize...
We study some convergence issues for a recent approach to the problem of transparent boundary condit...
AbstractWe present an efficient integral equation approach to solve the forced heat equation, ut(x)−...
Many problems of fundamental and practical importance in science and engineering are naturally set ...
We consider the numerical solution by finite difference methods of the heat equation in one space di...