On interpreting Patterson--Sullivan measures of geometrically finite groups as Hausdorff and packing measures
Abstract
We provide a new proof of a theorem whose proof was sketched by Sullivan ('82), namely that if the Poincar\'e exponent of a geometrically finite Kleinian group G is strictly between its minimal and maximal cusp ranks, then the Patterson--Sullivan measure of G is not proportional to the Hausdorff or packing measure of any gauge function. This disproves a conjecture of Stratmann ('97, '06).
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