Danskin's theorem

Last updated July 02, 2023

In convex analysis, Danskin's theorem is a theorem which provides information about the derivatives of a function of the form

The theorem has applications in optimization, where it sometimes is used to solve minimax problems. The original theorem given by J. M. Danskin in his 1967 monograph ^[1] provides a formula for the directional derivative of the maximum of a (not necessarily convex) directionally differentiable function.

An extension to more general conditions was proven 1971 by Dimitri Bertsekas.

Statement

The following version is proven in "Nonlinear programming" (1991).^[2] Suppose $\phi (x,z)$ is a continuous function of two arguments,

{\displaystyle \phi

where $Z\subset \mathbb {R} ^{m}$ is a compact set. Further assume that $\phi (x,z)$ is convex in $x$ for every $z\in Z.$

Under these conditions, Danskin's theorem provides conclusions regarding the convexity and differentiability of the function

f(x)=\max _{z\in Z}\phi (x,z).

To state these results, we define the set of maximizing points $Z_{0}(x)$ as

Z_{0}(x)=\left\{{\overline {z}}:\phi (x,{\overline {z}})=\max _{z\in Z}\phi (x,z)\right\}.

Danskin's theorem then provides the following results.

Convexity: $f(x)$ is convex.

Directional semi-differential: The semi-differential of $f(x)$ in the direction $y$ , denoted $\partial _{y}\ f(x),$ is given by $\partial _{y}f(x)=\max _{z\in Z_{0}(x)}\phi '(x,z;y),$ where $\phi '(x,z;y)$ is the directional derivative of the function $\phi (\cdot ,z)$ at $x$ in the direction $y.$

Derivative: $f(x)$ is differentiable at $x$ if $Z_{0}(x)$ consists of a single element ${\overline {z}}$ . In this case, the derivative of $f(x)$ (or the gradient of $f(x)$ if $x$ is a vector) is given by ${\frac {\partial f}{\partial x}}={\frac {\partial \phi (x,{\overline {z}})}{\partial x}}.$

Example of no directional derivative

In the statement of Danskin, it is important to conclude semi-differentiability of $f$ and not directional-derivative as explains this simple example. Set $Z=\{-1,+1\},\ \phi (x,z)=zx$ , we get $f(x)=|x|$ which is semi-differentiable with $\partial _{-}f(0)=-1,\partial _{+}f(0)=+1$ but has not a directional derivative at $x=0$ .

Subdifferential

If

\phi (x,z)

is differentiable with respect to

x

for all

z\in Z,

and if

\partial \phi /\partial x

is continuous with respect to

z

for all

x

, then the subdifferential of

f(x)

is given by

\partial f(x)=\mathrm {conv} \left\{{\frac {\partial \phi (x,z)}{\partial x}}:z\in Z_{0}(x)\right\}

where

\mathrm {conv}

indicates the convex hull operation.

Extension

The 1971 Ph.D. Thesis by Dimitri P. Bertsekas (Proposition A.22) ^[3] proves a more general result, which does not require that $\phi (\cdot ,z)$ is differentiable. Instead it assumes that $\phi (\cdot ,z)$ is an extended real-valued closed proper convex function for each $z$ in the compact set $Z,$ that $\operatorname {int} (\operatorname {dom} (f)),$ the interior of the effective domain of $f,$ is nonempty, and that $\phi$ is continuous on the set $\operatorname {int} (\operatorname {dom} (f))\times Z.$ Then for all $x$ in $\operatorname {int} (\operatorname {dom} (f)),$ the subdifferential of $f$ at $x$ is given by

\partial f(x)=\operatorname {conv} \left\{\partial \phi (x,z):z\in Z_{0}(x)\right\}

where $\partial \phi (x,z)$ is the subdifferential of $\phi (\cdot ,z)$ at $x$ for any $z$ in $Z.$

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References

↑ Danskin, John M. (1967). The theory of Max-Min and its application to weapons allocation problems. New York: Springer.
↑ Bertsekas, Dimitri P. (1999). Nonlinear programming (Second ed.). Belmont, Massachusetts. ISBN 1-886529-00-0.
↑ Bertsekas, Dimitri P. (1971). Control of Uncertain Systems with a Set-Membership Description of Uncertainty (PDF) (PhD). Cambridge, MA: MIT.

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[monograph-1] Danskin, John M. (1967). The theory of Max-Min and its application to weapons allocation problems. New York: Springer.

[bertsekas99-2] Bertsekas, Dimitri P. (1999). Nonlinear programming (Second ed.). Belmont, Massachusetts. ISBN 1-886529-00-0.

[3] Bertsekas, Dimitri P. (1971). Control of Uncertain Systems with a Set-Membership Description of Uncertainty (PDF) (PhD). Cambridge, MA: MIT.

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v t e Convex analysis and variational analysis
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