Convex sets, linear space of
A space whose elements are equivalence classes of pairs $(X,Y)$ of convex sets (cf. Convex set) in a locally convex linear topological space. The pair $(X,Y)$ is treated as the "difference" $X-Y$, pairs $(X_1,Y_1)$ and $(X_2,Y_2)$ being equivalent by definition if $X_1+Y_2=X_2+Y_1$, where addition of sets is understood to mean the closure of the vector sum. Addition, subtraction, multiplication by a scalar, and a topology are introduced in the space of convex sets, that space becoming thereby a locally convex topological space. Also the concept of partial ordering is introduced, which is analogous to inclusion of sets. Linear spaces of convex sets are also considered in non-locally convex linear spaces.
References
[1] | A.G. Pinsker, "The space of convex sets of a locally convex space" Trudy Leningrad. Inzh.-Ekon. Inst. , 63 (1966) pp. 13–17 (In Russian) |
Convex sets, linear space of. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Convex_sets,_linear_space_of&oldid=14891