Solving the Biharmonic Equation as Coupled Finite Difference Equations

A mathematical expericent is used to study the dependence of the efficiency of a multimesh relaxation method on the difference approximation of the boundary conditions for the biharmonic equation. Computational results are given, illustrating the rate of convergence of the iterations. A comparison i

We define the notion of a Liouvillian sequence and show that the solution space of a difference equation with rational function coefficients has a basis of Liouvillian sequences iff the Galois group of the equation is solvable. Using this we give a procedure to determine the Liouvillian solutions of

## Abstract The Poisson–Boltzmann equation can be used to calculate the electrostatic potential field of a molecule surrounded by a solvent containing mobile ions. The Poisson–Boltzmann equation is a non‐linear partial differential equation. Finite‐difference methods of solving this equation have b