Weak duality applied mathematics , weak duality concept in optimization which states that the duality gap is always greater than or equal to 0. That means the solution to the primal problem is always greater than or equal to the solution to an associated dual problem . This is opposed to strong duality which only holds in certain cases.Uses Many primal-dual approximation algorithms are based on the principle of weak duality.The primal problem:dual problem ,c T x ≤ b T y .Namely , if is a feasible solution for the primal maximization linear program and is a feasible solution for the dual minimization linear program, then the weak duality theorem can be stated as coefficients of the respective objective functions .c T x = x T c x T A T y b T y Generalizations More generally, if is a feasible solution for the primal maximization problem and is a feasible solution for the dual minimization problem, then weak duality implies where and are the objective functions for the primal and dual problems respectively.
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