Numerical solutions of the vertical structure equation and associated energetics

The root structure of the equation sin(z) = cz is studied for Ic I < 1, and an iterative root finding method for the nonreal roots, based on an equation x = f(x) for the real part, is presented.

In 1798 J.-L. Lagrange published an extensive book on the solution of numerical equations. Lagrange had developed four versions of a general systematic algorithm for detecting, isolating, and approximating, with arbitrary precision, all real and complex roots of a polynomial equation with real coeff

## Abstract A numerical method to solve the Reynolds‐averaged Navier–Stokes equations with the presence of discontinuities is outlined and discussed. The pressure is decomposed into the sum of a hydrostatic component and a hydrodynamic component. The numerical technique is based upon the classical

A numerical scheme for the solution of the vertical boundary-layer equations in a two-dimensional horizontally heated cavity filled with a porous medium is described. A novel feature of the problem is that although the equations are parabolic, the core boundary conditions at the edge of the layer ar