The following publications are possibly variants of this publication:
- Numerical Stability of Finite Difference Algorithms for Electrochemical Kinetic Simulations. Matrix Stability Analysis of the Classic Explicit, Fully Implicit and Crank-Nicolson Methods, Extended to the 3- and 4-point Gradient Approximation at the ElectroLeslaw K. Bieniasz, Ole Østerby, Dieter Britz. CANDC, 19(4):351-355, 1995. [doi]
- Numerical Stability of the Saul yev Finite Difference Algorithms for Electrochemical Kinetic Simulations: Matrix Stability Analysis for an Example Problem Involving Mixed Boundary ConditionsLeslaw K. Bieniasz, Ole Østerby, Dieter Britz. CANDC, 19(4):357-370, 1995. [doi]
- The Effect of the Discretization of the Mixed Boundary Conditions on the Numerical Stability of the Crank-Nicolson Algorithm of Electrochemical Kinetic SimulationsLeslaw K. Bieniasz, Ole Østerby, Dieter Britz. CANDC, 21(6):391-401, 1997. [doi]