On a convex operator for finite sets

Let S be a finite set with m elements in a real linear space and let J_S be a set of m intervals in R. We introduce a convex operator co(S,J_S) which generalizes the familiar concepts of the convex hull, , and the affine hull, , of S. We prove that each homothet of that is contained in can be obtained using this operator. A variety of convex subsets of with interesting combinatorial properties can also be obtained. For example, this operator can assign a regular dodecagon to the 4-element set consisting of the vertices and the orthocenter of an equilateral triangle. For two types of families J_S we give two different upper bounds for the number of vertices of the polytopes produced as co(S,J_S). Our motivation comes from a recent improvement of the well-known Gauss-Lucas theorem. It turns out that a particular convex set co(S,J_S) plays a central role in this improvement.