An infinite class of convex tangent cones

Random objects taking on values in a locally compact second countable convex cone are studied. The convex cone is assumed to have the property that the class of continuous additive positively homogeneous functionals is separating, an assumption which turns out to imply that the cone is positive. Inf

for all w in G. G is called reach-preservable if each of its spanning trees contains at least one reachpreserving vertex. We show that K 2,n is reach-preservable. We show that a graph is bipartite if and only if given any pair of vertices, there exists a spanning tree in which both vertices a reach-

A gcntraiized Room sq~re C of otdelr n and degree k is an (L':) x (",I'} array, each ce!P of which -is either empty or contains an unotdered k-tuple of a set k , ISI = n, such that each row and each alumn of the array rzntains each element of S exactly one ar,d 9 contains each unordered k-tulple of