Fenchel-Moreau and Primal/Dual Optimization Problems: Difference between revisions
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The Fenchel-Moreau Theorem<ref name="Brezis" /> is a fundamental result in convex analysis, characterizing the class of functions for which a function equals its biconjugate. A key consequence of this theorem is that is provides sufficient conditions for the equivalence of ''primal'' and ''dual'' optimization problems.<ref name="Rockafellar" /> | |||
==Fenchel-Moreau Theorem== | |||
Given a normed vector space ''X'' and <math> f: X \to \mathbb{R} \cup \{+\infty\} </math>, then | |||
:<math> f \text{ is convex and lower semicontinuous} \iff f^{**} = f. </math> | |||
==Background on Convex Conjugate Functions== | |||
Let ''X'' be a normed vector space, and let ''X*'' denote its topological dual. Given an extended real-valued function <math> f: X \to \mathbb{R} \cup \{+\infty\} </math>, its ''convex conjugate'' <math>f^*:X^* \to \mathbb{R} \cup \{+\infty\}</math> is defined by | |||
:<math> f^*(y):=\sup_{x \in X} \{ \langle y,x \rangle - f(x) \} \quad \forall y \in X^*. </math> | |||
An immediate consequence of this definition is ''Young's Inequality'', | |||
:<math> f^*(y) +f(x) \geq \langle y,x \rangle \quad \forall x \in X, y \in X^* . </math> | |||
Furthermore, it follows directly from the definition that, for ''any'' function ''f'', its conjugate function ''f*'' is convex and lower semicontinuous. | |||
In a similar way, for any function ''f'', its the ''biconjugate'' function <math>f^{**}:X \to \mathbb{R} \cup \{+\infty\} </math> is defined by | |||
:<math> f^{**}(x):=\sup_{y \in X^*} \{ \langle y,x \rangle - f^*(y) \} \quad \forall y \in X^*. </math> | |||
As above, the biconjugate function ''f**'' is always convex and lower semicontinuous. Furthermore, by a second application of Young's inequality, we have | |||
:<math> f^{**}(x) \leq f(x) \quad \forall x \in X. </math> | |||
Since ''f**'' is always convex and lower semicontinuous, in order for equality to hold for all ''x'', it is necessary that ''f'' also be convex and lower semicontinuous. The heart of Fenchel-Moreau Theorem is that this condition is not just necessary, but sufficient. | |||
==Application to Primal/Dual Optimization Problems== | |||
An important consequence of the Fenchel-Moreau Theorem is that it provides sufficient conditions for the equivalence of primal and dual optimization problems. Given a normed vector space ''X'' and a lower semicontinuous, convex function <math>f: X \to \mathbb{R}\cup \{+\infty\}</math>, the ''primal'' optimization problem is given by | |||
:<math> \inf_{x \in X} f(x). </math> | |||
The corresponding dual problem arises from a suitable ``perturbation" of the primal problem, subject to a parameter ''u'' ∈ ''U'', where ''U'' is also a normed vector space. In particular, let <math> F:X \times U \to \mathbb{R} \cup \{+\infty\} </math> be a proper convex function so that <math> f(x) = F(x,0) </math>. Then the corresponding ''primal'' and ''dual'' problems may be written as | |||
:<math> P_0 := \inf_{x \in X} F(x,0) </math> | |||
:<math> D_0 := \sup_{v \in U^*} -F^*(0,v) </math> | |||
The formulation of these problems becomes even simpler from the perspective of the ''inf-projection'' <math> P(u) := \inf_{x} F(x,u) </math>. With this notation, the primal and dual problems are given by | |||
:<math> P_0 = P(0)</math> | |||
:<math> D_0 =P^{**}(0) </math> | |||
Therefore, by the Fenchel-Moreau theorem, a sufficient condition for equivalence of the primal and dual problems is that the inf-projetion function ''P(u)'' is convex and lower semicontinuous. | |||
==References== | ==References== | ||
<references> | |||
<ref name="Brezis">[https://link.springer.com/book/10.1007/978-0-387-70914-7 H. Brezis, ''Functional Analysis, Sobolev Spaces, and Partial Differential Equations'', Chapter 1.]</ref> | |||
<ref name="Rockafellar">[https://link.springer.com/book/10.1007/978-3-642-02431-3 R. T. Rockafellar and R. J-B. Wets, ''Variational Analysis'', Chapter 11.]</ref> | |||
</references> |
Latest revision as of 04:39, 28 February 2022
The Fenchel-Moreau Theorem[1] is a fundamental result in convex analysis, characterizing the class of functions for which a function equals its biconjugate. A key consequence of this theorem is that is provides sufficient conditions for the equivalence of primal and dual optimization problems.[2]
Fenchel-Moreau Theorem
Given a normed vector space X and , then
Background on Convex Conjugate Functions
Let X be a normed vector space, and let X* denote its topological dual. Given an extended real-valued function , its convex conjugate is defined by
An immediate consequence of this definition is Young's Inequality,
Furthermore, it follows directly from the definition that, for any function f, its conjugate function f* is convex and lower semicontinuous.
In a similar way, for any function f, its the biconjugate function is defined by
As above, the biconjugate function f** is always convex and lower semicontinuous. Furthermore, by a second application of Young's inequality, we have
Since f** is always convex and lower semicontinuous, in order for equality to hold for all x, it is necessary that f also be convex and lower semicontinuous. The heart of Fenchel-Moreau Theorem is that this condition is not just necessary, but sufficient.
Application to Primal/Dual Optimization Problems
An important consequence of the Fenchel-Moreau Theorem is that it provides sufficient conditions for the equivalence of primal and dual optimization problems. Given a normed vector space X and a lower semicontinuous, convex function , the primal optimization problem is given by
The corresponding dual problem arises from a suitable ``perturbation" of the primal problem, subject to a parameter u ∈ U, where U is also a normed vector space. In particular, let be a proper convex function so that . Then the corresponding primal and dual problems may be written as
The formulation of these problems becomes even simpler from the perspective of the inf-projection . With this notation, the primal and dual problems are given by
Therefore, by the Fenchel-Moreau theorem, a sufficient condition for equivalence of the primal and dual problems is that the inf-projetion function P(u) is convex and lower semicontinuous.