A short Method for Kepler's Problem

A new approximate Solution of Kepler's Problem. By H. 8. Howe. From the well known approximate equation I in which e and M are respectively the eccentricity and the mean anomaly, and B' is an approximate value of the eccentric anomaly we derive tan : 111. (3) 2

A kind of generalized inverse eigenvalue problem is proposed which includes the additive, multiplicative and classical inverse eigenvalue problems as special cases. Newton's method is applied, and a local convergence analysis is given for both the distinct and the multiple eigenvalue cases. When the

This communication presents a spectral method for solving time-varying linear quadratic optimal control problems. Legendre-Gauss-Lobatto nodes are used to construct the mth-degree polynomial approximation of the state and control variables. The derivative x (t) of the state vector x(t) is approximae

In this paper a further method is presented to solve problems involving contact mechanics. The basic idea is related to a special modification of the unconstrained functional to include inequality constraints. The modification is constructed in such a way that minimal point of the unconstrained pote