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Quantization dimensions of compactly supported probability measures via Rényi dimensions
Abstract: We provide a full picture of the upper quantization dimension in terms of the Rényi dimension, in that we prove that the upper quantization dimension of order r > 0 for an arbitrary compactly supported Borel probability measure ν is given by its Rényi dimension at the point q r where the L q -spectrum of ν and the line through the origin with slope r intersect. In particular, this proves the continuity of r → D r (ν) as conjectured by Lindsay (2001). This viewpoint also sheds new light on the connection of the…
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2023
2023
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