Convex conjugate

(Redirected from Fenchel-Young inequality) Generalization of the Legendre transformation

In mathematics and mathematical optimization, the convex conjugate of a function is a generalization of the Legendre transformation which applies to non-convex functions. It is also known as Legendre–Fenchel transformation, Fenchel transformation, or Fenchel conjugate (after Adrien-Marie Legendre and Werner Fenchel). The convex conjugate is widely used for constructing the dual problem in optimization theory, thus generalizing Lagrangian duality.

Definition

Let $X$ be a real topological vector space and let $X^{*}$ be the dual space to $X$ . Denote by

\langle \cdot ,\cdot \rangle :X^{*}\times X\to \mathbb {R}

the canonical dual pairing, which is defined by $\left\langle x^{*},x\right\rangle \mapsto x^{*}(x).$

For a function $f:X\to \mathbb {R} \cup \{-\infty ,+\infty \}$ taking values on the extended real number line, its convex conjugate is the function

f^{*}:X^{*}\to \mathbb {R} \cup \{-\infty ,+\infty \}

whose value at $x^{*}\in X^{*}$ is defined to be the supremum:

f^{*}\left(x^{*}\right):=\sup \left\{\left\langle x^{*},x\right\rangle -f(x)~\colon ~x\in X\right\},

or, equivalently, in terms of the infimum:

f^{*}\left(x^{*}\right):=-\inf \left\{f(x)-\left\langle x^{*},x\right\rangle ~\colon ~x\in X\right\}.

This definition can be interpreted as an encoding of the convex hull of the function's epigraph in terms of its supporting hyperplanes.

Examples

For more examples, see § Table of selected convex conjugates.

The convex conjugate of an affine function $f(x)=\left\langle a,x\right\rangle -b$ is $f^{*}\left(x^{*}\right)={\begin{cases}b,&x^{*}=a\\+\infty ,&x^{*}\neq a.\end{cases}}$
The convex conjugate of a power function $f(x)={\frac {1}{p}}|x|^{p},1<p<\infty$ is $f^{*}\left(x^{*}\right)={\frac {1}{q}}|x^{*}|^{q},1<q<\infty ,{\text{where}}{\tfrac {1}{p}}+{\tfrac {1}{q}}=1.$
The convex conjugate of the absolute value function $f(x)=\left|x\right|$ is $f^{*}\left(x^{*}\right)={\begin{cases}0,&\left|x^{*}\right|\leq 1\\\infty ,&\left|x^{*}\right|>1.\end{cases}}$
The convex conjugate of the exponential function $f(x)=e^{x}$ is $f^{*}\left(x^{*}\right)={\begin{cases}x^{*}\ln x^{*}-x^{*},&x^{*}>0\\0,&x^{*}=0\\\infty ,&x^{*}<0.\end{cases}}$

The convex conjugate and Legendre transform of the exponential function agree except that the domain of the convex conjugate is strictly larger as the Legendre transform is only defined for positive real numbers.

Connection with expected shortfall (average value at risk)

See this article for example.

Let F denote a cumulative distribution function of a random variable X. Then (integrating by parts), $f(x):=\int _{-\infty }^{x}F(u)\,du=\operatorname {E} \left=x-\operatorname {E} \left$ has the convex conjugate $f^{*}(p)=\int _{0}^{p}F^{-1}(q)\,dq=(p-1)F^{-1}(p)+\operatorname {E} \left=pF^{-1}(p)-\operatorname {E} \left.$

Ordering

A particular interpretation has the transform $f^{\text{inc}}(x):=\arg \sup _{t}t\cdot x-\int _{0}^{1}\max\{t-f(u),0\}\,du,$ as this is a nondecreasing rearrangement of the initial function f; in particular, $f^{\text{inc}}=f$ for f nondecreasing.

Properties

The convex conjugate of a closed convex function is again a closed convex function. The convex conjugate of a polyhedral convex function (a convex function with polyhedral epigraph) is again a polyhedral convex function.

Order reversing

Declare that $f\leq g$ if and only if $f(x)\leq g(x)$ for all $x.$ Then convex-conjugation is order-reversing, which by definition means that if $f\leq g$ then $f^{*}\geq g^{*}.$

For a family of functions $\left(f_{\alpha }\right)_{\alpha }$ it follows from the fact that supremums may be interchanged that

\left(\inf _{\alpha }f_{\alpha }\right)^{*}(x^{*})=\sup _{\alpha }f_{\alpha }^{*}(x^{*}),

and from the max–min inequality that

\left(\sup _{\alpha }f_{\alpha }\right)^{*}(x^{*})\leq \inf _{\alpha }f_{\alpha }^{*}(x^{*}).

Biconjugate

The convex conjugate of a function is always lower semi-continuous. The biconjugate $f^{**}$ (the convex conjugate of the convex conjugate) is also the closed convex hull, i.e. the largest lower semi-continuous convex function with $f^{**}\leq f.$ For proper functions $f,$

f=f^{**}

if and only if

f

is convex and lower semi-continuous, by the Fenchel–Moreau theorem.

Fenchel's inequality

For any function f and its convex conjugate f *, Fenchel's inequality (also known as the Fenchel–Young inequality) holds for every $x\in X$ and $p\in X^{*}$ :

\left\langle p,x\right\rangle \leq f(x)+f^{*}(p).

Furthermore, the equality holds only when $p\in \partial f(x)$ . The proof follows from the definition of convex conjugate: $f^{*}(p)=\sup _{\tilde {x}}\left\{\langle p,{\tilde {x}}\rangle -f({\tilde {x}})\right\}\geq \langle p,x\rangle -f(x).$

Convexity

For two functions $f_{0}$ and $f_{1}$ and a number $0\leq \lambda \leq 1$ the convexity relation

\left((1-\lambda )f_{0}+\lambda f_{1}\right)^{*}\leq (1-\lambda )f_{0}^{*}+\lambda f_{1}^{*}

holds. The ${*}$ operation is a convex mapping itself.

Infimal convolution

The infimal convolution (or epi-sum) of two functions $f$ and $g$ is defined as

\left(f\operatorname {\Box } g\right)(x)=\inf \left\{f(x-y)+g(y)\mid y\in \mathbb {R} ^{n}\right\}.

Let $f_{1},\ldots ,f_{m}$ be proper, convex and lower semicontinuous functions on $\mathbb {R} ^{n}.$ Then the infimal convolution is convex and lower semicontinuous (but not necessarily proper), and satisfies

\left(f_{1}\operatorname {\Box } \cdots \operatorname {\Box } f_{m}\right)^{*}=f_{1}^{*}+\cdots +f_{m}^{*}.

The infimal convolution of two functions has a geometric interpretation: The (strict) epigraph of the infimal convolution of two functions is the Minkowski sum of the (strict) epigraphs of those functions.

Maximizing argument

If the function $f$ is differentiable, then its derivative is the maximizing argument in the computation of the convex conjugate:

f^{\prime }(x)=x^{*}(x):=\arg \sup _{x^{*}}{\langle x,x^{*}\rangle }-f^{*}\left(x^{*}\right)

and

f^{{*}\prime }\left(x^{*}\right)=x\left(x^{*}\right):=\arg \sup _{x}{\langle x,x^{*}\rangle }-f(x);

hence

x=\nabla f^{*}\left(\nabla f(x)\right),

x^{*}=\nabla f\left(\nabla f^{*}\left(x^{*}\right)\right),

and moreover

f^{\prime \prime }(x)\cdot f^{{*}\prime \prime }\left(x^{*}(x)\right)=1,

f^{{*}\prime \prime }\left(x^{*}\right)\cdot f^{\prime \prime }\left(x(x^{*})\right)=1.

Scaling properties

If for some $\gamma >0,$ $g(x)=\alpha +\beta x+\gamma \cdot f\left(\lambda x+\delta \right)$ , then

g^{*}\left(x^{*}\right)=-\alpha -\delta {\frac {x^{*}-\beta }{\lambda }}+\gamma \cdot f^{*}\left({\frac {x^{*}-\beta }{\lambda \gamma }}\right).

Behavior under linear transformations

Let $A:X\to Y$ be a bounded linear operator. For any convex function $f$ on $X,$

\left(Af\right)^{*}=f^{*}A^{*}

where

(Af)(y)=\inf\{f(x):x\in X,Ax=y\}

is the preimage of $f$ with respect to $A$ and $A^{*}$ is the adjoint operator of $A.$

A closed convex function $f$ is symmetric with respect to a given set $G$ of orthogonal linear transformations,

f(Ax)=f(x)

for all

x

and all

A\in G

if and only if its convex conjugate $f^{*}$ is symmetric with respect to $G.$

Table of selected convex conjugates

The following table provides Legendre transforms for many common functions as well as a few useful properties.

$g(x)$	$\operatorname {dom} (g)$	$g^{}(x^{})$	$\operatorname {dom} (g^{*})$
$f(ax)$ (where $a\neq 0$ )	$X$	$f^{}\left({\frac {x^{}}{a}}\right)$	$X^{*}$
$f(x+b)$	$X$	$f^{}(x^{})-\langle b,x^{*}\rangle$	$X^{*}$
$af(x)$ (where $a>0$ )	$X$	$af^{}\left({\frac {x^{}}{a}}\right)$	$X^{*}$
$\alpha +\beta x+\gamma \cdot f(\lambda x+\delta )$	$X$	$-\alpha -\delta {\frac {x^{}-\beta }{\lambda }}+\gamma \cdot f^{}\left({\frac {x^{*}-\beta }{\gamma \lambda }}\right)\quad (\gamma >0)$	$X^{*}$
${\frac {\|x\|^{p}}{p}}$ (where $p>1$ )	$\mathbb {R}$	${\frac {\|x^{*}\|^{q}}{q}}$ (where ${\frac {1}{p}}+{\frac {1}{q}}=1$ )	$\mathbb {R}$
${\frac {-x^{p}}{p}}$ (where $0<p<1$ )	$\mathbb {R} _{+}$	${\frac {-(-x^{*})^{q}}{q}}$ (where ${\frac {1}{p}}+{\frac {1}{q}}=1$ )	$\mathbb {R} _{--}$
${\sqrt {1+x^{2}}}$	$\mathbb {R}$	$-{\sqrt {1-(x^{*})^{2}}}$	$[- 1, 1]$
$-\log(x)$	$\mathbb {R} _{++}$	$-(1+\log(-x^{*}))$	$\mathbb {R} _{--}$
$e^{x}$	$\mathbb {R}$	${\begin{cases}x^{}\log(x^{})-x^{}&{\text{if }}x^{}>0\\0&{\text{if }}x^{*}=0\end{cases}}$	$\mathbb {R} _{+}$
$\log \left(1+e^{x}\right)$	$\mathbb {R}$	${\begin{cases}x^{}\log(x^{})+(1-x^{})\log(1-x^{})&{\text{if }}0<x^{}<1\\0&{\text{if }}x^{}=0,1\end{cases}}$	$[0, 1]$
$-\log \left(1-e^{x}\right)$	$\mathbb {R} _{--}$	${\begin{cases}x^{}\log(x^{})-(1+x^{})\log(1+x^{})&{\text{if }}x^{}>0\\0&{\text{if }}x^{}=0\end{cases}}$	$\mathbb {R} _{+}$

References

"Legendre Transform". Retrieved April 14, 2019.
Phelps, Robert (1993). Convex Functions, Monotone Operators and Differentiability (2 ed.). Springer. p. 42. ISBN 0-387-56715-1.
Bauschke, Heinz H.; Goebel, Rafal; Lucet, Yves; Wang, Xianfu (2008). "The Proximal Average: Basic Theory". SIAM Journal on Optimization. 19 (2): 766. CiteSeerX 10.1.1.546.4270. doi:10.1137/070687542.
Ioffe, A.D. and Tichomirov, V.M. (1979), Theorie der Extremalaufgaben. Deutscher Verlag der Wissenschaften. Satz 3.4.3
Borwein, Jonathan; Lewis, Adrian (2006). Convex Analysis and Nonlinear Optimization: Theory and Examples (2 ed.). Springer. pp. 50–51. ISBN 978-0-387-29570-1.

Arnol'd, Vladimir Igorevich (1989). Mathematical Methods of Classical Mechanics (Second ed.). Springer. ISBN 0-387-96890-3. MR 0997295.
Rockafellar, R. Tyrrell; Wets, Roger J.-B. (26 June 2009). Variational Analysis. Grundlehren der mathematischen Wissenschaften. Vol. 317. Berlin New York: Springer Science & Business Media. ISBN 9783642024313. OCLC 883392544.
Rockafellar, R. Tyrell (1970). Convex Analysis. Princeton: Princeton University Press. ISBN 0-691-01586-4. MR 0274683.

v t e Convex analysis and variational analysis
Basic concepts	Convex combination Convex function Convex set
Topics (list)	Choquet theory Convex geometry Convex metric space Convex optimization Duality Lagrange multiplier Legendre transformation Locally convex topological vector space Simplex
Maps	Convex conjugate Concave (Closed K- Logarithmically Proper Pseudo- Quasi-) Convex function Invex function Legendre transformation Semi-continuity Subderivative
Main results (list)	Carathéodory's theorem Ekeland's variational principle Fenchel–Moreau theorem Fenchel-Young inequality Jensen's inequality Hermite–Hadamard inequality Krein–Milman theorem Mazur's lemma Shapley–Folkman lemma Robinson–Ursescu Simons Ursescu
Sets	Convex hull (Orthogonally, Pseudo-) Convex set Effective domain Epigraph Hypograph John ellipsoid Lens Radial set/Algebraic interior Zonotope
Series	Convex series related ((cs, lcs)-closed, (cs, bcs)-complete, (lower) ideally convex, (Hx), and (Hwx))
Duality	Dual system Duality gap Strong duality Weak duality
Applications and related	Convexity in economics

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