Adaptive multilevel finite element solution of the Poisson-Boltzmann equation I. Algorithms and examples
- 30 November 2000
- journal article
- research article
- Published by Wiley in Journal of Computational Chemistry
- Vol. 21 (15) , 1319-1342
- https://doi.org/10.1002/1096-987x(20001130)21:15<1319::aid-jcc1>3.0.co;2-8
Abstract
No abstract availableKeywords
This publication has 57 references indexed in Scilit:
- Mesh Smoothing Using A Posteriori Error EstimatesSIAM Journal on Numerical Analysis, 1997
- A posteriori finite element error estimators for parametrized nonlinear boundary value problemsNumerical Functional Analysis and Optimization, 1996
- An analytical algorithm for the rapid determination of the solvent accessibility of points in a three‐dimensional lattice around a solute moleculeJournal of Computational Chemistry, 1995
- Relationship between tetrahedron shape measuresBIT Numerical Mathematics, 1994
- A posteriori finite element error estimators for indefinite elliptic boundary value problems∗Numerical Functional Analysis and Optimization, 1994
- Solving the finite‐difference non‐linear Poisson–Boltzmann equationJournal of Computational Chemistry, 1992
- New method for the computation of ionic distribution around rod‐like polyelectrolytes with the helical distribution of charges. I. General approach and a nonlinearized Poisson–Boltzmann equationJournal of Computational Chemistry, 1991
- Local mesh refinement in 2 and 3 dimensionsIMPACT of Computing in Science and Engineering, 1991
- Solutions of the full Poisson-Boltzmann equation with application to diffusion-controlled reactionsThe Journal of Physical Chemistry, 1989
- Global approximate Newton methodsNumerische Mathematik, 1981