The Johnson-Lindenstrauss lemma is optimal for linear dimensionality reduction
Abstract
For any n>1 and 0<<1/2, we show the existence of an nO(1)-point subset X of Rn such that any linear map from (X,2) to 2m with distortion at most 1+ must have m = (\n, -2 n\). Our lower bound matches the upper bounds provided by the identity matrix and the Johnson-Lindenstrauss lemma, improving the previous lower bound of Alon by a (1/) factor.
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