Bounding the set of solutions of a perturbed global optimization problem

We use bifurcation theory to study positive, negative, and sign-changing solutions for several classes of boundary value problems, depending on a real parameter . We show the existence of infinitely many points of pitchfork bifurcation, and study global properties of the solution curves.

In this paper, we estabfish some bounds for the probability that simulated annealing produces an optimal or near-optlmal solution. Such bounds are giveat for both asymptotical and finite mlmher of steps in the algorithm, and they depend only on the instance of the problem to be treated. Then we comp

Uniformly valid asymptotic approximations to a singularly perturbed nonlinear twopoint boundary value problem of optimal control theory may be constructed by a computationally simple method. Snmmm'y--An optimal control problem of some nonlinear differential equations containing a small parameter is