On the multiparameter Falconer distance problem
Abstract
We study an extension of the Falconer distance problem in the multiparameter setting. Given ≥ 1 and Rd=Rd1×·s ×Rd, di≥ 2. For any compact set E⊂ Rd with Hausdorff dimension larger than d-(di)2+14 if (di) is even, d-(di)2+14+14(di) if (di) is odd, we prove that the multiparameter distance set of E has positive -dimensional Lebesgue measure. A key ingredient in the proof is a new multiparameter radial projection theorem for fractal measures.
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