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Line 3: Quadratic programming problem can be formulated like this: Assume x belongs to '''R'''<sup>n</sup> space. The (n x n) [[matrix]] E is [[positive semidefinite]]. Minimize (with respect to x) f(x) = 0.5 x' E x + f' x with the following ~~boundary~~ constraints (if there exists an answer then it satisfies these): (1) Ax <= b (inequality constraint) (2) Cx = d (~~optional~~equality contraint) Since f(x) is a '''convex function''', and constraints are '''linear functions''', we have from optimization theory that for point x to be an optimum point it is necessary and sufficient that x is a Kuhn-Tucker point. ~~The (n x n) [[matrix]] E is usually [[positive semidefinite]].~~ (this article needs a lot more work..)

Quadratic programming: Difference between revisions