Alternating direction implicit (ADI) schemes for two-dimensional parabolic equations with a mixed derivative are constructed by using the class of all A sub 0-stable linear two-step methods in conjunction with the method of approximation factorization. The mixed derivative is treated with an explicit two-step method which is compatible with an implicit A sub 0-stable method. The parameter space for which the resulting ADI schemes are second order accurate and unconditionally stable is determined. Some numerical examples are given
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
AbstractThis paper proposes a new numerical method based on an implicit difference scheme and the Fo...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
AbstractAn alternating-direction implicit method for N-dimensional parabolic equations with mixed de...
An alternating direction implicit (ADI) scheme was constructed by the method of approximate factoriz...
An alternating direction (A.D.I.) method, which requires the solution of two block tridiagonal sets ...
AbstractWe derive a class of two-level high-order implicit finite difference schemes for solving thr...
AbstractWe propose a new two-level implicit difference method of O(k2+kh2+h4) for the solution of si...
We introduce a class of alternating direction implicit (ADI) methods, based on approximate factoriza...
We derive a class of two-level high-order implicit finite difference schemes for solving three-dimen...
In this paper, we use the alternating direction method for isogeometric finite elements to simulate ...
AbstractNonclassical parabolic initial-boundary value problems arise in the study of several importa...
These lecture notes are designed for a one-semester course on finite-difference methods for paraboli...
AbstractA numerical comparison is made between three integration methods for semi-discrete parabolic...
AbstractIn this paper we present and analyze new methods to integrate multidimensional parabolic pro...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
AbstractThis paper proposes a new numerical method based on an implicit difference scheme and the Fo...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
AbstractAn alternating-direction implicit method for N-dimensional parabolic equations with mixed de...
An alternating direction implicit (ADI) scheme was constructed by the method of approximate factoriz...
An alternating direction (A.D.I.) method, which requires the solution of two block tridiagonal sets ...
AbstractWe derive a class of two-level high-order implicit finite difference schemes for solving thr...
AbstractWe propose a new two-level implicit difference method of O(k2+kh2+h4) for the solution of si...
We introduce a class of alternating direction implicit (ADI) methods, based on approximate factoriza...
We derive a class of two-level high-order implicit finite difference schemes for solving three-dimen...
In this paper, we use the alternating direction method for isogeometric finite elements to simulate ...
AbstractNonclassical parabolic initial-boundary value problems arise in the study of several importa...
These lecture notes are designed for a one-semester course on finite-difference methods for paraboli...
AbstractA numerical comparison is made between three integration methods for semi-discrete parabolic...
AbstractIn this paper we present and analyze new methods to integrate multidimensional parabolic pro...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
AbstractThis paper proposes a new numerical method based on an implicit difference scheme and the Fo...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...