A restricted-entry method for a transportation problem with piecewise-linear concave costs

We consider a single-product, discrete-time productioniinventory-control problem with nonstationary concave nondecreasing costs. Given a forecast horizon K . the problem is to find a decision horizon. We specialize to piecewise linear costs a general approach whereby a problem with horizon K + 1 and

## Abstract A cutting plane method for solving concave minimization problems with linear constraints has been advanced by Tui. The principle behind this cutting plane has been applied to integer programming by Balas, Young, Glover, and others under the name of convexity cuts. This paper relates th

## Abstract This paper is concerned with non‐linear parabolic problems. This particular type of probiem arose from the study of the instability of transverse detonation waves in channels. A fairly complete account of the equilibrium states is given. A global approach is adopted for the upper and lo

Piecewise-linearized methods for the solution of two-point boundary value problems in ordinary differential equations are presented. These problems are approximated by piecewise linear ones which have analytical solutions and reduced to finding the slope of the solution at the left boundary so that