Improving the Johnson-Lindenstrauss Lemma

Abstract

The Johnson-Lindenstrauss Lemma allows for the projection of n points in p-dimensional Euclidean space onto a k-dimensional Euclidean space, with k 24 n3ε2-2ε3, so that the pairwise distances are preserved within a factor of 1ε. Here, working directly with the distributions of the random distances rather than resorting to the moment generating function technique, an improvement on the lower bound for k is obtained. The additional reduction in dimension when compared to bounds found in the literature, is at least 13\%, and, in some cases, up to 30\% additional reduction is achieved. Using the moment generating function technique, we further provide a lower bound for k using pairwise L2 distances in the space of points to be projected and pairwise L1 distances in the space of the projected points. Comparison with the results obtained in the literature shows that the bound presented here provides an additional 36-40\% reduction.