A Nyström method for the discretization of thermal layer potentials is proposed and analyzed. The method is based on considering the poten-tials as generalized Abel integral operators in time, where the kernel is a time dependent surface integral operator. The time discretization is the trapezoidal rule with a corrected weight at the endpoint to compensate for singularities of the integrand. The spatial discretization is a standard quadrature rule for surface integrals of smooth functions. We will discuss stability and convergence results of this discretization scheme for second-kind boundary integral equations of the heat equation. The method is explicit, does not require the computation of influence coefficients, and can be combined easi...
Abstract. We consider spline collocation methods for a class of parabolic pseudodiffer-ential operat...
Vita.The heat equation is a basic partial differential equation modelling heat conduction. Many nume...
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...
Abstract Time dependence in parabolic boundary integral operators appears in form of an integral ove...
In time-dependent boundary integral equations, a boundary element me\-thod in space can be coupled w...
The goal of this work is to develop a fast method for solving Galerkin discretizations of boundary i...
We present a unified boundary integral approach for the stable numerical solution of the ill-posed C...
AbstractMany problems in applied mathematics, physics, and engineering require the solution of the h...
The heat-balance integral method of Goodman has been thoroughly analyzed in the case of a parabolic ...
Boundary integral formulations of the heat equation involve time con-volutions in addition to surfac...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
The most popular methods used for solving transient heat conduction problems, like finite element me...
In this paper we consider boundary integral methods applied to boundary value problems for the posit...
We treat the time discretization of an initial-value problem for a homogeneous abstract parabolic eq...
This Dissertation is devoted to the study of some integral operators arising in parabolic potential ...
Abstract. We consider spline collocation methods for a class of parabolic pseudodiffer-ential operat...
Vita.The heat equation is a basic partial differential equation modelling heat conduction. Many nume...
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...
Abstract Time dependence in parabolic boundary integral operators appears in form of an integral ove...
In time-dependent boundary integral equations, a boundary element me\-thod in space can be coupled w...
The goal of this work is to develop a fast method for solving Galerkin discretizations of boundary i...
We present a unified boundary integral approach for the stable numerical solution of the ill-posed C...
AbstractMany problems in applied mathematics, physics, and engineering require the solution of the h...
The heat-balance integral method of Goodman has been thoroughly analyzed in the case of a parabolic ...
Boundary integral formulations of the heat equation involve time con-volutions in addition to surfac...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
The most popular methods used for solving transient heat conduction problems, like finite element me...
In this paper we consider boundary integral methods applied to boundary value problems for the posit...
We treat the time discretization of an initial-value problem for a homogeneous abstract parabolic eq...
This Dissertation is devoted to the study of some integral operators arising in parabolic potential ...
Abstract. We consider spline collocation methods for a class of parabolic pseudodiffer-ential operat...
Vita.The heat equation is a basic partial differential equation modelling heat conduction. Many nume...
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...