Convex analysis Convex analysismathematics devoted to the study of properties of convex functions and convex sets, often with applications in convex minimization , a subdomain of optimization theory .Convex sets A convex set C ⊆ X , for some vector space X , such that for any x , y ∈ C and λ ∈ thenConvex functions A convex function extended real-valued function f : X → R ∪ which satisfies Jensen's inequality , i.e. for any x , y ∈ X and any λ ∈ thenreal valued function such that its epigraph Convex conjugate The convex conjugate real-valued function f : X → R ∪ is f* : X* → R ∪ where X* is the dual space of X , andBiconjugate The biconjugate f : X → R ∪ is the conjugate of the conjugate, typically written as f** : X → R ∪. The biconjugate is useful for showing when strong or weak duality hold.x ∈ X the inequality f** ≤ f follows from the Fenchel–Young inequality . For proper functions , f = f** if and only if f is convex and lower semi-continuous by Fenchel–Moreau theorem .Convex minimization A convex minimization problem is one of the formf : X → R ∪ is a convex function and M ⊆ X is a convex set.Dual problem In optimization theory, the duality principle states that optimization problems may be viewed from either of two perspectives , the primal problem or the dual problem .separated locally convex spaces and. Then given the function f : X → R ∪, we can define the primal problem as finding x such thatf by letting where I is the indicator function . Then let F : X × Y → R ∪ be a perturbation function such that F = f .dual problem with respect to the chosen perturbation function is given byF* is the convex conjugate in both variables of F .duality gap is the difference of the right and left hand sides of the inequalitytwo sides are equal to each other, then the problem is said to satisfy strong duality .objective function L is the Lagrange dual function defined as follows:
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