Maximum theorem

The maximum theorem provides conditions for the continuity of an optimized function and the set of its maximizers as a parameter changes. The statement was first proven by Claude Berge in 1959^[1]. The theorem is primarily used in mathematical economics.

1 Statement of theorem
2 Interpretation
3 Proof
4 Variants
5 Examples
6 See also
7 Notes
8 References

Statement of theorem

Let $X$ and $Θ$ be metric spaces, $f:X\times\Theta\to\mathbb{R}$ be a function jointly continuous in its two arguments, and $\mathcal{C}:\Theta\twoheadrightarrow X$ be a compact-valued correspondence.

For $x$ in $X$ and $θ$ in $Θ$ , let

$f^*(\theta)=\max\{f(x,\theta)|x\in C(\theta)\}$ and

$C^*(\theta)=\mathrm{arg}\max\{f(x,\theta)|x\in C(\theta)\}=\{x\in C(\theta)\,|\,f(x,\theta)=f^*(\theta)\}$ .

If $C$ is continuous (i.e. both upper and lower hemicontinuous) at some $θ$ , then $f *$ is continuous at $θ$ and $C *$ is non-empty, compact-valued, and upper hemicontinuous at $θ$ .

Interpretation

The theorem is typically interpreted as providing conditions for a parametric optimization problem to have continuous solutions with regard to the parameter. In this case, $Θ$ is the parameter space, $f (x,θ)$ is the function to be maximized, and $C (θ)$ gives the constraint set that $f$ is maximized over. Then, $f * (θ)$ is the maximized value of the function and $C *$ is the set of points that maximize $f$ .

The result is that if the elements of an optimization problem are sufficiently continuous, then some, but not all, of that continuity is preserved in the solutions.

Proof

The proof relies primarily on the sequential definitions of upper and lower hemicontinuity.

Because $C$ is compact-valued and $f$ is continuous, the extreme value theorem guarantees the constrained maximum of $f$ is well-defined and $C * (θ)$ is non-empty for all $θ$ in $Θ$ . Then, let $θ n$ be a sequence converging to $θ$ and $x_n \in C^*(\theta_n)$ be a sequence in $X$ . Since $C$ is upper hemicontinuous, there exists a convergent subsequence $x_{n_k}\to x \in C(\theta)$ .

If it is shown that $x \in C^*(\theta)$ , then

$\lim_{k \to \infty} f^*(\theta_{n_k}) = \lim_{k \to \infty} f(x_{n_k},\theta_{n_k}) = f(x,\theta) = f^*(\theta)$

which would simultaneously prove the continuity of $f *$ and the upper hemicontinuity of $C *$ .

Suppose to the contrary that $x \not\in C^*(\theta)$ , i.e. there exists an $\hat{x}\in C(\theta)$ such that $f(\hat{x},\theta) > f(x,\theta)$ . Because $C$ is lower hemicontinuous, there is a further subsequence of $n k$ such that $\hat{x}_{n_j} \in C(\theta_{n_j})$ and $\hat{x}_{n_j} \to \hat{x}$ . By the continuity of $f$ and the contradiction hypothesis,

$\lim_{j \to \infty} f(\hat{x}_{n_j},\theta_{n_j}) = f(\hat{x},\theta) > f(x,\theta) = \lim_{j \to \infty} f(x_{n_j},\theta_{n_j})$ .

But this implies that for sufficiently large $j$ ,

$f(\hat{x}_{n_j},\theta_{n_j}) > f(x_{n_j},\theta_{n_j})$

which would mean $x_{n_j}$ is not a maximizer, a contradiction of $x_n \in C^*(\theta_n)$ . This establishes the continuity of $f *$ and the upper hemicontinuity of $C *$ .

Because $C^*(\theta) \subset C(\theta)$ and $C (θ)$ is compact, it is sufficient to show $C *$ is closed-valued for it to be compact-valued. This can be done by contradiction using sequences similar to above.

Variants

If in addition to the conditions above, $f$ is quasiconcave in $x$ for each $θ$ and $C$ is convex-valued, then $C *$ is also convex-valued. If $f$ is strictly quasiconcave in $x$ for each $θ$ and $C$ is convex-valued, then $C *$ is single-valued, and thus is a continuous function rather than a correspondence.

If $f$ is concave and $C$ has a convex graph, then $f *$ is concave and $C *$ is convex-valued. Similarly to above, if $f$ is strictly concave, then $C *$ is a continuous function.^[2]

Examples

Consider a utility maximization problem where a consumer makes a choice from their budget set. Translating from the notation above to the standard consumer theory notation,

$X=\mathbb{R}_+^l$ is the space of all bundles of $l$ commodities,
$\Theta=\mathbb{R}_{++}^l \times \mathbb{R}_{++}$ represents the price vector of the commodities $p$ and the consumer's wealth $w$ ,
$f (x,θ) = u (x)$ is the consumer's utility function, and
$C(\theta)=B(p,w)=\{x \,|\, px \leq w\}$ is the consumer's budget set.

Then,

$f * (θ) = v (p, w)$ is the indirect utility function and
$C * (θ) = x (p, w)$ is the Marshallian demand.

Proofs in general equilibrium theory often apply the Brouwer or Kakutani fixed point theorems to the consumer's demand, which require compactness and continuity, and the maximum theorem provides the sufficient conditions to do so.

Notes

^ Ok, p. 306
^ Sundaram, p. 239

References

Claude Berge (1963). Topological Spaces. Oliver and Boyd.
Efe Ok (2007). Real analysis with economics applications. Princeton University Press. ISBN 0-691-11768-3.
Rangarajan K. Sundaram (1996). A first course in optimization theory. Cambridge University Press. ISBN 978-0-521-49770-1.

Categories:

Mathematical optimization
Continuous mappings

Wikimedia Foundation. 2010.

Игры ⚽ Поможем сделать НИР

Look at other dictionaries:

Maximum power principle — in Energy Systems Language adapted from Odum and Odum 2000, p. 38 The maximum power principle has been proposed as the fourth principle of energetics in open system thermodynamics, where an example of an open system is a biological cell.… … Wikipedia
Maximum parsimony — Maximum parsimony, often simply referred to as parsimony, is a non parametric statistical method commonly used in computational phylogenetics for estimating phylogenies. Under maximum parsimony, the preferred phylogenetic tree is the tree that… … Wikipedia
Maximum likelihood sequence estimation — (MLSE) is a mathematical algorithm to extract useful data out of a noisy data stream. Contents 1 Theory 2 Background 3 References 4 Further reading … Wikipedia
Maximum power — can refer to different concepts: In electronics, the maximum power theorem In systems theory, the maximum power principle This disambiguation page lists articles associated with the same title. If an interna … Wikipedia
Maximum power transfer theorem — In electrical engineering, the maximum power transfer theorem states that, to obtain maximum external power from a source with a finite internal resistance, the resistance of the load must be equal to the resistance of the source as viewed from… … Wikipedia
Maximum power theorem — In electrical engineering, the maximum power (transfer) theorem states that, to obtain maximum external power from a source with a finite internal resistance, the resistance of the load must be made the same as that of the source. It is claimed… … Wikipedia
Maximum likelihood — In statistics, maximum likelihood estimation (MLE) is a method of estimating the parameters of a statistical model. When applied to a data set and given a statistical model, maximum likelihood estimation provides estimates for the model s… … Wikipedia
Maximum entropy thermodynamics — In physics, maximum entropy thermodynamics (colloquially, MaxEnt thermodynamics) views equilibrium thermodynamics and statistical mechanics as inference processes. More specifically, MaxEnt applies inference techniques rooted in Shannon… … Wikipedia
Maximum entropy probability distribution — In statistics and information theory, a maximum entropy probability distribution is a probability distribution whose entropy is at least as great as that of all other members of a specified class of distributions. According to the principle of… … Wikipedia
Maximum flow problem — An example of a flow network with a maximum flow. The source is s, and the sink t. The numbers denote flow and capacity. In optimization theory, the maximum flow problem is to find a feasible flow through a single source, single sink flow network … Wikipedia

Academic Dictionaries and Encyclopedias

Maximum theorem

Contents

Statement of theorem

Interpretation

Proof

Variants

Examples

See also

Notes

References

Look at other dictionaries:

Share the article and excerpts

Academic Dictionaries and Encyclopedias

Wikipedia

Maximum theorem

Contents

Statement of theorem

Interpretation

Proof

Variants

Examples

See also

Notes

References

Look at other dictionaries:

Share the article and excerpts

Direct link