Infinite Horizon Boundary Value Problems and Applications

A common method for numerically approximating two-point parabolic boundary value problems of the form u, = L[u] +f(u) defined on the semi-infinite strip S = [0, 11 X [0, 00) is to first discretize the spatial operator in the differential equation and then solve for the time evolution. Such an approa

In this paper the relations between the finite horizon optimal control problem with receding horizon and the infinite horizon problem are discussed; the system is assumed to be linear, time-invariant, and stabilizable. The cost function is quadratic but the output in the integral of the cost functio

This paper presents some results on the existence and uniqueness of solutions for the boundary value problems on the half-line with impulses and infinite delay. Moreover, an existence theorem of multiple solutions is obtained also. The problems may be singular at the boundary.

A solution of the maximum principle is optimal if it is 'surrounded' by solutions of the maximum principle, or 'embedded in a field of extremals'. An extension of this well-known principle to infinite horizon problems, is stated, and a proof of it is outlined. It is especially useful in non-concave