What Is Multiobjective Optimization?
For multiple objective optimization problems, see "Optimization Problems." From all possible alternatives to a problem, choose the solution that is optimal for a certain indicator. Mathematically speaking, optimization is to study the minimization or maximization of functional J (u) on a given set S: In a broad sense, optimization includes mathematical programming, graphs and networks, combinatorial optimization, Inventory theory, decision theory, queuing theory, optimal control, etc. In the narrow sense, optimization is only exponential planning. Optimization methods are widely used in the fields of production management, economic planning, engineering design, and system control. Research on optimization problems has a long history. [1]