Special exact solutions of Einstein's equations — A theorem and some observations

Differential difference equations, bounda.ry value problems, fundamental matrices, completely continuous linear operators, Jacobiall matrices and approximate solutions.

## Abstract The solutions of the equation \documentclass{article}\pagestyle{empty}\begin{document}$ \partial \_t^n f(x,t) = \hat L(x,t)f(x,t) + S(x,t) $\end{document}, for __L̂__ a linear operator are derived. Different forms for __L̂__ whether it is time independent or time dependent and self‐comm

We consider the operator equation SX -~)~t i U, XV, = Y where { U, }. { t~ } are some commutative sets of operators but in general { U, } need not commute with { 1,)}. Particular cases of this equation are the Syivester and Ljaptmov equations. We give a new representation and an approximation of the

## Abstract A methodology is presented for constructing a family of exact axially‐symmetric solutions to various geophysical fluid‐dynamics equation sets, with the aim of facilitating the development and testing of numerical models. The construction is done first for the shallow‐water equations in