Strauch & Tóth [1] showed that for any choice of upper and lower density, there is some subset of $\mathbb{N}$ with the chosen densities, provided the lower is no more than the upper and both are in [0, 1]. Mišík [2] extended this to show that for any choice of upper density, lower density, upper logarithmic density, and lower logarithmic density there is a subset of $\mathbb{N}$ with the chosen densities, provided they follow the necessary inequalities $0\le\underline d\le\underline\delta\le\overline d\le\overline\delta\le1.$ Is there a similar result with the uniform densities? $$ \underline{u}(A)=\lim_s\frac1s\liminf_n\sum_\stackrel{a\in A}{\ n < a\le n+s}1 $$ $$ \overline{u}(A)=\lim_s\frac1s\limsup_n\sum_\stackrel{a\in A}{\ n < a\le n+s}1 $$ An ideal result would combine all three density types with the inequality $$ 0\le\underline{u}\le\underline{d}\le\underline{\delta}\le\overline{\delta}\le\overline{d}\le\overline{u}\le1 $$ but I'm looking for any published results on the topic. [1] Strauch and Tóth, Asymptotic density of $A\subset N$ and density of the ratio set $R(A)$. _Acta Arith._ **87** (1998), pp. 67-78. [2] Ladislav Mišík, Sets of positive integers with prescribed values of densities, _Mathematica Slovaca_ **52**:3 (2002), pp. 289-296.