What is the relationship between the hausdorff dimension and cardinality of a set?

Specifically, assuming the Continuum Hypothesis, if a set has Hausdorff dimension greater than zero does, that imply that its cardinality is equal too or greater than that of 2^Aleph_0?

Or, does the negation of CH, imply the existence of a set with positive Hausdorff dimension and cardinality strictly between Aleph_0 and 2^Aleph_0?