Add to ORKGWe show that if a numerical method is posed as a sequence of operators acting on data and depending on a parameter, typically a measure of the size of discretization, then consistency, convergence and stability can be related by a Lax-Richtmyer type equivalence theorem ??????a consistent method is convergent if and only if it is stable. We de?ne consistency as convergence on a dense subspace and stability as discrete well-posedness. In some applications convergence is harder to prove than consistency or stability since convergence requires knowledge of the solution. An equivalence theorem can be useful in such settings. We give concrete instances of equivalence theorems for polynomial interpolation, numerical di?erentiation, numerical integ...
Numerical methods for solving initial value problems in ordinary differential equations are studied....
This paper is concerned with computing very high order accurate linear functionals from a numerical ...
The classical theory of numerical methods for partial differential equations is concerned to a large...
Abstract. We show that if a numerical method is posed as a sequence of operators acting on data and ...
We show that if a numerical method is posed as a sequence of operators acting on data and depending ...
In this book, the author compares the meaning of stability in different subfields of numerical mathe...
This work deals with the consistency of �nite di�erence approximations. We investigate the relation ...
Abstract. It is natural to expect the following loosely stated approximation principle to hold: a nu...
Lax and Richtmyer developed a theory of algorithms for linear initial value problems that guarantees...
We present a (partial) historical summary of the mathematical analysis of finite differences and fin...
This thesis discusses several topics related to interpolation and how it is used in numerical analys...
This paper studies the application of interval analysis and consistency techniques to ordinary diffe...
It is widely believed that order of exactness is a good measure of the quality of an algorithm for n...
In the paper, we are concerned with some computational aspects of smooth approximation of data. This...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
Numerical methods for solving initial value problems in ordinary differential equations are studied....
This paper is concerned with computing very high order accurate linear functionals from a numerical ...
The classical theory of numerical methods for partial differential equations is concerned to a large...
Abstract. We show that if a numerical method is posed as a sequence of operators acting on data and ...
We show that if a numerical method is posed as a sequence of operators acting on data and depending ...
In this book, the author compares the meaning of stability in different subfields of numerical mathe...
This work deals with the consistency of �nite di�erence approximations. We investigate the relation ...
Abstract. It is natural to expect the following loosely stated approximation principle to hold: a nu...
Lax and Richtmyer developed a theory of algorithms for linear initial value problems that guarantees...
We present a (partial) historical summary of the mathematical analysis of finite differences and fin...
This thesis discusses several topics related to interpolation and how it is used in numerical analys...
This paper studies the application of interval analysis and consistency techniques to ordinary diffe...
It is widely believed that order of exactness is a good measure of the quality of an algorithm for n...
In the paper, we are concerned with some computational aspects of smooth approximation of data. This...
summary:In the paper, we are concerned with some computational aspects of smooth approximation of da...
Numerical methods for solving initial value problems in ordinary differential equations are studied....
This paper is concerned with computing very high order accurate linear functionals from a numerical ...
The classical theory of numerical methods for partial differential equations is concerned to a large...