The importance of convexity arguments in functional analysis has long been realized, but a comprehensive theory of infinite-dimensional convex sets has hardly existed for more than a decade. In fact, the integral representation theorems of Choquet and Bishop -de Leeuw together with the uniqueness theorem of Choquet inaugurated a new epoch in infinite-dimensional convexity. Initially considered curious and tech- nically difficult, these theorems attracted many mathematicians, and the proofs were gradually simplified and fitted into a general theory. The results can no longer be considered very "deep" or difficult, but they certainly remain all the more important. Today Choquet Theory provides a unified approach to integral representations in fields as diverse as potential theory, probability, function algebras, operator theory, group representations and ergodic theory. At the same time the new concepts and results have made it possible, and relevant, to ask new questions within the abstract theory itself. Such questions pertain to the interplay between compact convex sets K and their associated spaces A(K) of continuous affine functions; to the duality between faces of K and appropriate ideals of A(K); to dominated- extension problems for continuous affine functions on faces; and to direct convex sum decomposition into faces, as well as to integral for- mulas generalizing such decompositions. These problems are of geometric interest in their own right, but they are primarily suggested by applica- tions, in particular to operator theory and function algebras.

Table of Contents:
I Representations of Points by Boundary Measures.- 1. Distinguished Classes of Functions on a Compact Convex Set.- Classes of continuous and semicontinuous, affine and convex functions.- Uniform and pointwise approximation theorems.-Envelopes.-*Grothendieck's completeness theorem.-Theorems of Banach-Dieudonne and Krein-Smulyan*.- 2. Weak Integrals, Moments and Barycenters.- Preliminaries and notations from integration theory.-An existence theorem for weak integrals.-Vague density of point-measures with prescribed barycenter.-*Choquet's barycenter formula for affine Baire functions of first class, and a counterexample for affine functions of higher class*.- 3. Comparison of Measures on a Compact Convex Set.- Ordering of measures.-The concept of dilation for simple measures.-The fundamental lemma on the existence of majorants.-Characterization of envelopes by integrals.-*Dilation of general measures.-Cartier's Theorem*.- 4. Choquet's Theorem.- A characterization of extreme points by means of envelopes.-The concept of a boundary set.-Herve's theorem on the existence of a strictly convex function on a metrizable compact convex set.-The concept of a boundary measure, and Mokobodzki's characterization of boundary measures.-The integral representation theorem of Choquet and Bishop - de Leeuw.-A maximum principle for superior limits of 1.s.c. convex functions.-Bishop - de Leeuw's integral theorem relatively to a ?-field on the extreme boundary.-*A counterexample based on the "porcupine topology"*.- 5. Abstract Boundaries Defined by Cones of Functions.- The concept of a Choquet boundary.-Bauer's maximum principle.-The Choquet-Edwards theorem that Choquet boundaries are Baire spaces.-The concept of a Silov boundary.-Integral representation by means of measures on the Choquet boundary.- 6. Unilateral Representation Theorems with Application to Simplicial Boundary Measures.- Ordered convex compacts.-Existence of maximal extreme points.-Characterization of the set of maximal extreme points as a Choquet boundary.-Definition and basic properties of simplicial measures.-Existence of simplicial boundary measures, and the Caratheodory Theorem in ?n.-Decomposition of representing boundary measures into simplicial components.- II Structure of Compact Convex Sets.- 1. Order-unit and Base-norm Spaces.- Basic properties of (Archimedean) order-unit spaces.-A representation theorem of Kadison.-The vector-lattice theorem of Stone-Kakutani-KreinYosida.-Duality of order-unit and base-norm spaces.- 2. Elementary Embedding Theorems.- Representation of a closed subspace A of C?(X) as an A(K)-space by the canonical embedding of X in A*.-The concept of an "abstract compact convex" and its regular embedding in a locally convex Hausdorff space.-The connection between compact convex sets and locally compact cones.- 3. Choquet Simplexes.- Riesz' decomposition property and lattice cones.-Choquet's uniqueness theorem.-Choquet-Meyer's characterizations of simplexes by envelopes.-Edward's separation theorem.-Continuous affine extensions of functions defined on compact subsets of the extreme boundary of a simplex.-Affine Borel extensions of functions defined on the extreme boundary of a simplex.-*Examples of "non-metrizable" pathologies in simplexes.*.- 4. Bauer Simplexes and the Dirichlet Problem of the Extreme Boundary.- Bauer's characterizations of simplexes with closed extreme boundary.-The Dirichlet problem of the extreme boundary.-A criterion for the existence of continuous affine extensions of maps defined on extreme boundaries.- 5. Order Ideals, Faces, and Parts.- Elementary properties of order ideals and faces.-Extension property and characteristic number.-Archimedean and strongly Archimedean ideals and faces.-Exposed and relatively exposed faces.-Specialization to simplexes.-The concept of a "part", and an inequality of Harnack type.-Characterization of the parts of a simplex in terms of representing measures.-*An example of an Archimedean face which is not strongly Archimedean.*.- 6. Split-faces and Facial Topology.- Definition and elementary properties of split faces.-Characterization of split faces by relativization of orthogonal measures.-An extension theorem for continuous affine functions defined on a split face.- The facial topology.-Specialization to simplexes.-*Near-lattice ideals, and primitive ideal space.-The connection between facial topology and hull kernel topology.-Compact convex sets with sufficiently many inner automorphisms.-A remark on the applications to C*-algebras.*.- 7. The Concept of Center for A(K).- Extension of facially continuous functions.-The facial topology is Hausdorff for Bauer simplexes only.-The concept of center, and the connections with facially continuous functions and order-bounded operators.-Convex compact sets with trivial center.-*An example of a prime simplex.-Stormer's characterization of Bauer simplexes.*.- 8. Existence and Uniqueness of Maximal Central Measures Representing Points of an Arbitrary Compact Convex Set.- The relation xoy, and the concept of a primary point.-A point x is primary iff the local center at x is trivial.-The concept of a central measure.-s maximum principle.-The Choquet-Edwards theorem that Choquet boundaries are Baire spaces.-The concept of a Silov boundary.-Integral representation by means of measures on the Choquet boundary.- 6. Unilateral Representation Theorems with Application to Simplicial Boundary Measures.- Ordered convex compacts.-Existence of maximal extreme points.-Characterization of the set of maximal extreme points as a Choquet boundary.-Definition and basic properties of simplicial measures.-Existence of simplicial boundary measures, and the Caratheodory Theorem in ?n.-Decomposition of representing boundary measures into simplicial components.- II Structure of Compact Convex Sets.- 1. Order-unit and Base-norm Spaces.- Basic properties of (Archimedean) order-unit spaces.-A representation theorem of Kadison.-The vector-lattice theorem of Stone-Kakutani-KreinYosida.-Duality of order-unit and base-norm spaces.- 2. Elementary Embedding Theorems.- Representation of a closed subspace A of C?(X) as an A(K)-space by the canonical embedding of X in A*.-The concept of an "abstract compact convex" and its regular embedding in a locally convex Hausdorff space.-The connection between compact convex sets and locally compact cones.- 3. Choquet Simplexes.- Riesz' decomposition property and lattice cones.-Choquet's uniqueness theorem.-Choquet-Meyer's characterizations of simplexes by envelopes.-Edward's separation theorem.-Continuous affine extensions of functions defined on compact subsets of the extreme boundary of a simplex.-Affine Borel extensions of functions defined on the extreme boundary of a simplex.-*Examples of "non-metrizable" pathologies in simplexes.*.- 4. Bauer Simplexes and the Dirichlet Problem of the Extreme Boundary.- Bauer's characterizations of simplexes with closed extreme boundary.-The Dirichlet problem of the extreme boundary.-A criterion for the existence of continuous affine extensions of maps defined on extreme boundaries.- 5. Order Ideals, Faces, and Parts.- Elementary properties of order ideals and faces.-Extension property and characteristic number.-Archimedean and strongly Archimedean ideals and faces.-Exposed and relatively exposed faces.-Specialization to simplexes.-The concept of a "part", and an inequality of Harnack type.-Characterization of the parts of a simplex in terms of representing measures.-*An example of an Archimedean face which is not strongly Archimedean.*.- 6. Split-faces and Facial Topology.- Definition and elementary properties of split faces.-Characterization of split faces by relativization of orthogonal measures.-An extension theorem for continuous affine functions defined on a split face.- The facial topology.-Specialization to simplexes.-*Near-lattice ideals, and primitive ideal space.-The connection between facial topology and hull kernel topology.-Compact convex sets with sufficiently many inner automorphisms.-A remark on the applications to C*-algebras.*.- 7. The Concept of Center for A(K).- Extension of facially continuous functions.-The facial topology is Hausdorff for Bauer simplexes only.-The concept of center, and the connections with facially continuous functions and order-bounded operators.-Convex compact sets with trivial center.-*An example of a prime simplex.-Stormer's characterization of Bauer simplexes.*.- 8. Existence and Uniqueness of Maximal Central Measures Representing Points of an Arbitrary Compact Convex Set.- The relation xoy, and the concept of a primary point.-A point x is primary iff the local center at x is trivial.-The concept of a central measure.- Existence and uniqueness of maximal central measures in a special case.-The "lifting" technique.-Wils' theorem on the existence and uniqueness of maximal central measures which are pseudo-carried by the set of primary points.- References.