Some remarks on the exponential separation and dimension preserving approximation for sets and measures

In the dimension theory of sets and measures, a recent breakthrough happened due to Hochman, who introduced the exponential separation condition and proved the Hausdorff dimension result for invariant sets and measures generated by similarities on the real line. Following this groundbreaking work, we make a modest contribution by weakening the condition. We also define some sets in the class of all nonempty compact sets using the Assouad and Hausdorff dimensions and subsets of measures in the Borel probability measures using the $L^q$ dimension and prove their density in the respective spaces.