Inequalities for probability contents of convex sets via geometric average (Q1100797)
From MaRDI portal
 | This is the item page for this Wikibase entity, intended for internal use and editing purposes. Please use this page instead for the normal view: Inequalities for probability contents of convex sets via geometric average |
scientific article; zbMATH DE number 4044841
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Inequalities for probability contents of convex sets via geometric average |
scientific article; zbMATH DE number 4044841 |
Statements
Inequalities for probability contents of convex sets via geometric average (English)
0 references
1988
0 references
It is shown that: If \((X_ 1,X_ 2)\) is a permutation-invariant central convex unimodal random vector and if A is a symmetric (about 0), permutation-invariant convex set then \(P\{(aX_ 1,X_ 2/a)\in A\}\) is non-decreasing as a varies from \(0+\) to 1, and is nonincreasing as a varies from 1 to \(\infty\) (that is, \(P\{(a_ 1X_ 1,a_ 2X_ 2)\in A\}\) is a Schur-concave function of (log \(a_ 1,\log a_ 2))\). Some extensions of this result for the n-dimensional case are discussed. Applications are given for elliptically contoured distributions and scale parameter families.
0 references
peakedness
0 references
permutation-invariant convex set
0 references
elliptically contoured distributions
0 references
scale parameter families
0 references
0 references
