On the Existence of Solutions of Poisson Equation and Poincaré–Lelong Equation

The Lie group of virtual displacement operators in Rodrigues-Hamilton parameters is constructed and equations of motion are derived for a heavy rigid body with one fixed point. It is shown that the addition (subtraction) of a term of the form dr~dr, f(t, x) ~ C 2, to (from) the generalized Lagrangia

In this article, we consider a system of a Ginzburg᎐Landau equation in u coupled with a Poisson equation in , nonglobal. Our method uses energy arguments. We establish differential inequalities having only nonglobal solutions.

The solutions of the Poisson equation in regular and irregular shaped physical domains are obtained by the cubature method. The solutions of the three test problems involving regular shaped domains are compared with the analytical solutions and the control-volume, ®ve-point ®nite dierence, Galerkin