We have a cylindrical container that is defined using two design variables: the radius and the height. We want to find the solution that has the maximum volume (minimum opposite of volume) and the minimum external surface.
| Considering a very simple problem, it is possible to show that the weigthed
sum method cannot be successfully applied when the Pareto-optimal set is
not convex. We have a cylindrical container that is defined using two design variables: the radius and the height. We want to find the solution that has the maximum volume (minimum opposite of volume) and the minimum external surface.
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