Accession Number : AD0655379
Title : INTEGRAL REPRESENTATIONS ON COMPACT CONVEX SETS (CHOQUET THEORY),
Corporate Author : STATE UNIV OF NEW YORK STONY BROOK DEPT OF PHYSICS
Personal Author(s) : Lanford,Oscar E.
Report Date : 30 AUG 1966
Pagination or Media Count : 24
Abstract : These notes attempt to give an introduction to the theory of integral representations on compact convex sets developed first by G. Choquet and later by numerous other authors. They do not aim at completeness, but only at the presentation of the central results. The notes do attempt to give the proofs in sufficient detail to make them accessible to the non-specialist. It is assumed the reader has an elementary knowledge of point set topology, integration theory on locally compact spaces, and the theory of locally convex topological vector spaces.
Descriptors : (*CONVEX SETS, *TOPOLOGY), (*SET THEORY, NUMERICAL INTEGRATION), ALGEBRA, THEOREMS, INTEGRALS, MEASURE THEORY, STATISTICAL MECHANICS, QUANTUM STATISTICS, INVARIANCE, FUNCTIONS(MATHEMATICS)
Subject Categories : Theoretical Mathematics
Distribution Statement : APPROVED FOR PUBLIC RELEASE