Convex cones of generalized multiply monotone functions and the dual cones

Abstract

Let n and k be nonnegative integers such that 1 k n+1. The convex cone F+k:n of all functions f on an arbitrary interval I⊂eqR whose derivatives f(j) of orders j=k-1,…,n are nondecreasing is characterized in terms of extreme rays of the cone F+k:n. A simple description of the convex cone dual to F+k:n is given. These results are useful in, and were motivated by, applications in probability. In fact, the results are obtained in a more general setting with certain generalized derivatives of f of the jth order in place of f(j). Somewhat similar results were previously obtained in the case when the left endpoint of the interval I is finite, with certain additional integrability conditions; such conditions fail to hold in the mentioned applications.