Distance sets bounds for polyhedral norms via effective dimension
Abstract
We prove that, for every norm on Rd and every E ⊂eq Rd, the Hausdorff dimension of the distance set of E with respect to that norm is at least H E - (d-1). An explicit construction follows, demonstrating that this bound is sharp for every polyhedral norm on Rd. The techniques of algorithmic complexity theory underlie both the computations and the construction.
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