Optimization of Fishing Strategies in Space and Time as a Non-convex Optimal Control Problem |
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| Authors: | Malte Braack Martin F. Quaas Benjamin Tews Boris Vexler |
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| Affiliation: | 1.Mathematical Seminar,University of Kiel,Kiel,Germany;2.Faculty of Business, Economics and Social Sciences,University of Kiel,Kiel,Germany;3.P3 - Management Consulting and Engineering Solutions,Hamburg,Germany;4.Department of Mathematics,Technical University of Munich,Munich,Germany |
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| Abstract: | The behavior of a fishing fleet and its impact onto the biomass of fish can be described by a nonlinear parabolic diffusion–reaction equation. Looking for an optimal fishing strategy leads to a non-convex optimal control problem with a bilinear control action. In this work, we present such an optimal control formulation, prove its well-posedness and derive first- and second-order optimality conditions. These results provide a basis for tailored finite element discretization as well as for Newton type optimization algorithms. First numerical test problems show typical features as so-called No-Take-Zones and maximal fishing quota (total allowable catches) as parts of an optimal fishing strategy. |
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