solmaximum

Solmaximum is a term used in a theoretical framework of optimization to designate the maximal value attained by a specified objective function over a feasible set defined by constraints. It emphasizes the focus on a particular objective or variable of interest within a constrained system, and is analogous to the standard notion of a maximum in optimization.

Formal definition: Let F ⊆ R^n be the feasible set determined by constraint relations A x ≤ b,

Computation and properties: Existence of a solmaximum depends on compactness of the feasible set and continuity

Etymology and usage: The coinage solmaximum combines “solution” and “maximum” and is used to highlight the maximization

See also: maximum, argmax, supremum, constrained optimization, feasible set, Pareto frontier.