Highly-accurate numerical methods that can efficiently handle problems with interfaces and/or problems in domains with complex geometry are crucial for the resolution of different temporal and spatial scales in many problems from physics and biology. In this paper we continue the work started in [8], and we use modest one-dimensional parabolic problems as the initial step towards the development of high-order accurate methods based on the Difference Potentials approach. The designed methods are well-suited for variable coefficient parabolic models in heterogeneous media and/or models with non-matching interfaces and with non-matching grids. Numerical experiments are provided to illustrate high-order accuracy and efficiency of the developed ...
AbstractThis paper uses a cubic spline approximation to produce finite difference representations of...
We consider high order accurate difference schemes for second order parabolic equations in the quart...
A number of economical difference schemes which are applicable to regions of a special form (paralle...
This chapter discusses a new difference scheme for parabolic mixed initial-boundary value problems i...
Numerical approximations and modeling of many physical, biological, and biomedical problems often de...
In this work, we discuss and compare three methods for the numerical approximation of constant- and ...
The first chapter of the thesis is concerned with the construction of finite difference approximatio...
In this paper a general method is introduced for determining the stability and convergence of differ...
Abstract Based on the locally one-dimensional strategy, we propose two high order finite difference ...
1. In t roduct ion. In mathematical modeling of physical-chemical processes in composite bodies. it ...
Explicit difference approximations of parabolic initial boundary value problems are usually stable o...
Methods for comparing the accuracy of numerical methods for the solution of parabolic partial differ...
In [I] and 121 an economical method for solving parabolic equations with several variables, called a...
We derive a method to locally change the order of accuracy of finite difference schemes that approxi...
"The energy method is applied to study the stability of two types of difference approximations to pa...
AbstractThis paper uses a cubic spline approximation to produce finite difference representations of...
We consider high order accurate difference schemes for second order parabolic equations in the quart...
A number of economical difference schemes which are applicable to regions of a special form (paralle...
This chapter discusses a new difference scheme for parabolic mixed initial-boundary value problems i...
Numerical approximations and modeling of many physical, biological, and biomedical problems often de...
In this work, we discuss and compare three methods for the numerical approximation of constant- and ...
The first chapter of the thesis is concerned with the construction of finite difference approximatio...
In this paper a general method is introduced for determining the stability and convergence of differ...
Abstract Based on the locally one-dimensional strategy, we propose two high order finite difference ...
1. In t roduct ion. In mathematical modeling of physical-chemical processes in composite bodies. it ...
Explicit difference approximations of parabolic initial boundary value problems are usually stable o...
Methods for comparing the accuracy of numerical methods for the solution of parabolic partial differ...
In [I] and 121 an economical method for solving parabolic equations with several variables, called a...
We derive a method to locally change the order of accuracy of finite difference schemes that approxi...
"The energy method is applied to study the stability of two types of difference approximations to pa...
AbstractThis paper uses a cubic spline approximation to produce finite difference representations of...
We consider high order accurate difference schemes for second order parabolic equations in the quart...
A number of economical difference schemes which are applicable to regions of a special form (paralle...