Open AccessOn the hierarchical structure of Pareto critical sets
Author(s) -
Bennet Gebken,
Sebastian Peitz,
Michael Dellnitz
Publication year - 2019
Publication title -
aip conference proceedings
Language(s) - English
Resource type - Conference proceedings
eISSN - 1551-7616
pISSN - 0094-243X
DOI - 10.1063/1.5090008
Subject(s) - pareto principle , mathematical optimization , set (abstract data type) , multi objective optimization , boundary (topology) , space (punctuation) , computer science , pareto analysis , mathematics , pareto optimal , mathematical analysis , programming language , operating system
In this article we show that the boundary of the Pareto critical set of an unconstrained multiobjective optimization problem (MOP) consists of Pareto critical points of subproblems considering subsets of the objective functions. If the Pareto critical set is completely described by its boundary (e.g. if we have more objective functions than dimensions in the parameter space), this can be used to solve the MOP by solving a number of MOPs with fewer objective functions. If this is not the case, the results can still give insight into the structure of the Pareto critical set. This technique is especially useful for efficiently solving many-objective optimization problems by breaking them down into MOPs with a reduced number of objective functions.
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