Random compact set

In mathematics, a random compact set is essentially a compact set-valued random variable. Random compact sets are useful in the study of attractors for random dynamical systems.

Let ${\displaystyle (M,d)}$ be a complete separable metric space. Let ${\displaystyle 𝒦}$ denote the set of all compact subsets of ${\displaystyle M}$. The Hausdorff metric ${\displaystyle h}$ on ${\displaystyle 𝒦}$ is defined by

${\displaystyle h(K_1,K_2):=\max \{\underset{a\in K_1}{\sup }\underset{b\in K_2}{\inf }d(a,b),\underset{b\in K_2}{\sup }\underset{a\in K_1}{\inf }d(a,b)\}.}$

${\displaystyle (𝒦,h)}$ is also а complete separable metric space. The corresponding open subsets generate a σ-algebra on ${\displaystyle 𝒦}$, the Borel sigma algebra ${\displaystyle ℬ(𝒦)}$ of ${\displaystyle 𝒦}$.

A random compact set is а measurable function ${\displaystyle K}$ from а probability space ${\displaystyle (\Omega ,ℱ,\mathbb{P})}$ into ${\displaystyle (𝒦,ℬ(𝒦))}$.

Put another way, a random compact set is a measurable function ${\displaystyle K:\Omega \to 2^M}$ such that ${\displaystyle K(\omega )}$ is almost surely compact and

${\displaystyle \omega \mapsto \underset{b\in K(\omega )}{\inf }d(x,b)}$

is a measurable function for every ${\displaystyle x\in M}$.

Random compact sets in this sense are also random closed sets as in Matheron (1975). Consequently, under the additional assumption that the carrier space is locally compact, their distribution is given by the probabilities

${\displaystyle \mathbb{P}(X\cap K=\mathrm{\varnothing })}$ for ${\displaystyle K\in 𝒦.}$

(The distribution of а random compact convex set is also given by the system of all inclusion probabilities ${\displaystyle \mathbb{P}(X\subset K).}$)

For ${\displaystyle K=\{x\}}$, the probability ${\displaystyle \mathbb{P}(x\in X)}$ is obtained, which satisfies

${\displaystyle \mathbb{P}(x\in X)=1-\mathbb{P}(x\in ̸X).}$

Thus the covering function ${\displaystyle p_X}$ is given by

${\displaystyle p_X(x)=\mathbb{P}(x\in X)}$ for ${\displaystyle x\in M.}$

Of course, ${\displaystyle p_X}$ can also be interpreted as the mean of the indicator function ${\displaystyle {\mathrm{𝟏}}_X}$:

${\displaystyle p_X(x)=𝔼{\mathrm{𝟏}}_X(x).}$

The covering function takes values between ${\displaystyle 0}$ and ${\displaystyle 1}$. The set ${\displaystyle b_X}$ of all ${\displaystyle x\in M}$ with ${\displaystyle p_X(x)>0}$ is called the support of ${\displaystyle X}$. The set ${\displaystyle k_X}$, of all ${\displaystyle x\in M}$ with ${\displaystyle p_X(x)=1}$ is called the kernel, the set of fixed points, or essential minimum ${\displaystyle e(X)}$. If ${\displaystyle X_1,X_2,\dots }$, is а sequence of i.i.d. random compact sets, then almost surely

${\displaystyle {\displaystyle \bigcap _{i=1}^{\mathrm{\infty }}}{X}_i=e(X)}$

and ${\displaystyle {\displaystyle \bigcap _{i=1}^{\mathrm{\infty }}}{X}_i}$ converges almost surely to ${\displaystyle e(X).}$

• Matheron, G. (1975) Random Sets and Integral Geometry. J.Wiley & Sons, New York. Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value).
• Molchanov, I. (2005) The Theory of Random Sets. Springer, New York. Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value).
• Stoyan D., and H.Stoyan (1994) Fractals, Random Shapes and Point Fields. John Wiley & Sons, Chichester, New York. Lua error in Module:Citation/CS1/Configuration at line 2172: attempt to index field '?' (a nil value).