- W.-J. Beyn, T. Pampel, W.Semmler:
Dynamic optimization and Skiba sets in economic examples.
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We discuss two optimization problems from economics.
The first is a model of optimal investment and the second
is a model of resource management.
In both cases the time horizon is infinite and the
optimal control variables are continuous.
Typically, in these optimal control problems multiple steady states
and periodic orbits occur. This leads to multiple solutions of the
state-costate system each of which
relates to a locally optimal strategy but has its own limiting
behavior (stationary or periodic).
Initial states that allow different optimal solutions with the same
value of the objective function are called Skiba points.
The set of Skiba points is of interest, because it provides
thresholds for a global change of optimal strategies.
We provide a systematic numerical method for calculating locally
optimal solutions and Skiba points via boundary value problems.
In parametric or higher dimensional systems Skiba curves (or manifolds)
appear and we show how to follow them by a continuation process.
We apply our method to the models above
where Skiba sets consist of points or curves and where
optimal solutions have different stationary or periodic
asymptotic behavior.
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preprint_31_00.ps (1.4MB, includes 9 illustrations)
DFG-Projekt Verbindungsorbits (Bielefeld)
DFG-Schwerpunktprogramm Dynamik (Berlin)
Thorsten Pampel, erstellt am 18.10.2000
Fakultät für Mathematik |
Universität Bielefeld