Can a small Gaussian perturbation break subadditivity?

Abstract

Given an integer a 1, a function f: R R is said to be a-subadditive if f(ax+y) af(x)+f(y) \,\,\, for all x,y ∈ R. Of course, 1-subadditive functions (which correspond to ordinary subadditive functions) are 2-subadditive. % and 3-subadditive. Answering a question of Matkowski, we show that there exists a continuous function f satisfying f(0)=0 which is 2-subadditive but not 1-subadditive. In addition, the same example is not 3-subadditive, which shows that the sequence of families of continuous a-subadditive functions passing through the origin is not increasing with respect to a. The construction relies on a perturbation of a given subadditive function with an even Gaussian ring, which will destroy the original subadditivity while keeping the weaker property. Lastly, given a positive rational cone H⊂eq (0,∞) which is not finitely generated, we prove that there exists a subadditive bijection f:H H such that x 0f(x)=0 and x 0f(x)=1. This is related an open question of Matkowski and \'Swi atkowski in [Proc. Amer. Math. Soc. 119 (1993), 187--197].