Highly accurate solution of the axial dispersion model expressed in S-system canonical form by Taylor series method
- 15 August 2001
- journal article
- Published by Elsevier BV in Chemical Engineering Journal
- Vol. 83 (3), 175-183
- https://doi.org/10.1016/s1385-8947(00)00252-7
Abstract
No abstract availableThis publication has 22 references indexed in Scilit:
- Accuracies of Numerical Solutions of Dispersion Model by Orthogonal Collocation Method.KAGAKU KOGAKU RONBUNSHU, 1996
- An Efficient Method for Solving Two-Point Boundary Value Problems with Extremely High Accuracy.JOURNAL OF CHEMICAL ENGINEERING OF JAPAN, 1996
- Numerical solution of two-point boundary value problem by combined taylor series method with a technique for rapidly selecting suitable step sizes.JOURNAL OF CHEMICAL ENGINEERING OF JAPAN, 1995
- A comment on two modified numerical methods for solving steady one-dimensional diffusion problem.KAGAKU KOGAKU RONBUNSHU, 1989
- Note on a numerical method for solving a steady one-dimensional diffusion problem.KAGAKU KOGAKU RONBUNSHU, 1988
- Recasting nonlinear differential equations as S-systems: a canonical nonlinear formMathematical Biosciences, 1987
- Theoretical Analysis of a Packed-bed Biological Reactor for Various Reaction KineticsThe Chemical Engineering Journal, 1987
- Biochemical systems analysis: I. Some mathematical properties of the rate law for the component enzymatic reactionsJournal of Theoretical Biology, 1969
- The solution of a boundary value problem in reactor design using Galerkin's methodAIChE Journal, 1969
- Quasilinearization, difference approximation, and nonlinear boundary value problemsAIChE Journal, 1968