Upper and lower densities have the strong Darboux property

Abstract

Let P( N) be the power set of N. An upper density (on N) is a non\-decreasing and subadditive function μ: P( N) R such that μ( N) = 1 and μ(k · X + h) = 1k μ(X) for all X ⊂eq N and h,k ∈ N+, where k · X + h := \kx + h: x ∈ X\. The upper asymptotic, upper Banach, upper logarithmic, upper Buck, upper P\'olya, and upper analytic densities are examples of upper densities. We show that every upper density μ has the strong Darboux property, and so does the associated lower density, where a function f: P( N) R is said to have the strong Darboux property if, whenever X ⊂eq Y ⊂eq N and a ∈ [f(X),f(Y)], there is a set A such that X⊂eq A⊂eq Y and f(A)=a. In fact, we prove the above under the assumption that the monotonicity of μ is relaxed to the weaker condition that μ(X) 1 for every X ⊂eq N.