WKL0 and Stone's separation theorem for convex sets

A set S in 1 :" is said to he X,-convex if and only if S does not contain a visually independent subset having cardinality h', . It is natural tts ask when an h',-convex set may be expressed as a countable unI.,n of convex sets. Here i! is proved that if S is a closed h',-convex set in the plane and

We establish the following max-plus analogue of Minkowski's theorem. Any point of a compact max-plus convex subset of (R ∪ {-∞}) n can be written as the max-plus convex combination of at most n + 1 of the extreme points of this subset. We establish related results for closed max-plus cones and close

We study the Laplace transform on Hardy spaces on a class of convex domains in C n . We obtain a Paley-Wiener theorem with a norm that characterizes the entire functions of exponential type which occur as Laplace transforms. This is done by using the Fantappiè transform and the Borel transform to re