Quasi-arithmetic means ad libitum

Abstract

Let α1, …, αm be two or more positive reals with sum 1, let C⊂eq Rk be an open convex set, and f: C Rk be a continuous injection with convex image. For each nonempty set S⊂eq C, let M(S) be the family of quasi-arithmetic means of all m-tuples of vectors in C with respect to f and the weights α1,…,αm, that is, the family M(S)= \ f-1(α1f(x1)+·s+αmf(xm)): x1,…,xm ∈ S \. We provide a simple necessary and sufficient condition on S for which the infinite iteration nMn(S) is relatively dense in the convex hull of S.