AbstractThe purpose of this paper is to examine a boundary element collocation method for some parabolic pseudodifferential equations. The basic model problem for our investigation is the two-dimensional heat conduction problem with vanishing initial condition and a given Neumann or Dirichlet type boundary condition. Certain choices of the representation formula for the heat potential yield boundary integral equations of the first kind, namely the single layer and the hypersingular heat operator equations. Both of these operators, in particular, are covered by the class of parabolic pseudodifferential operators under consideration. Moreover, the spatial domain is allowed to have a general smooth boundary curve. As trial functions the tensor...
The following two types of problems in differential equations are investigated:(i) Second and sixth-...
This thesis presents a new class of collocation methods for the approximate numerical solution of li...
AbstractThis paper provides an overview of the formulation, analysis and implementation of orthogona...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
Abstract. We consider spline collocation methods for a class of parabolic pseudodiffer-ential operat...
Collocation with cubic splines is used as a method for solving Linear second order parabolic partial...
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...
AbstractThe original model problem is the two-dimensional heat conduction problem with vanishing ini...
Collocation at Gaussian points for a scalar m'th order ordinary differential equation has heen studi...
In this paper we consider a non polynomial function S (x) belong to space C 2 [a; b] where it to dep...
AbstractThis paper uses a cubic spline approximation to produce finite difference representations of...
In time-dependent boundary integral equations, a boundary element me\-thod in space can be coupled w...
A Nyström method for the discretization of thermal layer potentials is proposed and analyzed. The m...
In a recent paper the authors obtained stability and convergence results for spline colloca-tion met...
Numerical solutions of one-dimensional heat and advection-diffusion equations are obtained by colloc...
The following two types of problems in differential equations are investigated:(i) Second and sixth-...
This thesis presents a new class of collocation methods for the approximate numerical solution of li...
AbstractThis paper provides an overview of the formulation, analysis and implementation of orthogona...
AbstractThe purpose of this paper is to examine a boundary element collocation method for some parab...
Abstract. We consider spline collocation methods for a class of parabolic pseudodiffer-ential operat...
Collocation with cubic splines is used as a method for solving Linear second order parabolic partial...
Abstract This thesis summarizes certain boundary element methods applied to some initial and bounda...
AbstractThe original model problem is the two-dimensional heat conduction problem with vanishing ini...
Collocation at Gaussian points for a scalar m'th order ordinary differential equation has heen studi...
In this paper we consider a non polynomial function S (x) belong to space C 2 [a; b] where it to dep...
AbstractThis paper uses a cubic spline approximation to produce finite difference representations of...
In time-dependent boundary integral equations, a boundary element me\-thod in space can be coupled w...
A Nyström method for the discretization of thermal layer potentials is proposed and analyzed. The m...
In a recent paper the authors obtained stability and convergence results for spline colloca-tion met...
Numerical solutions of one-dimensional heat and advection-diffusion equations are obtained by colloc...
The following two types of problems in differential equations are investigated:(i) Second and sixth-...
This thesis presents a new class of collocation methods for the approximate numerical solution of li...
AbstractThis paper provides an overview of the formulation, analysis and implementation of orthogona...