An Accuracy Assessment of Cartesian-Mesh Approaches for the Euler Equations

A method for adaptive refinement of a Cartesian mesh for the solution of the steady Euler equations is presented. The algorithm creates an initial uniform mesh and cuts the body out of that mesh. The mesh is then refined based on body curvature. Next, the solution is converged to a steady state usin

## Abstract This paper presents the results of an investigation into a possible alternative to Monte Carlo methods for solving the transported probability density function (__PDF__) equation for scalars (compositions). The method uses a finite‐volume approach combined with adaptive mesh refinement

result (2) for a charged spherical particle and Hoskin's result A method is proposed to evaluate the accuracy of numerical (5) for two identically charged spherical particles. However, solutions of the nonlinear Poisson -Boltzmann equation for one cannot ensure that the new method is also of the sam

## RRIGS HYDRATION POTENTIAL conformations than for the near-native BPTI conformations. For charged forms, the correlation is much poorer. These results serve as evidence that solventexposure models of hydration, which leave out cooperative effects between different groups, may be appropriate for m