The Power of Recursive Embeddings for $\ell_p$ Metrics

Metric embedding is a powerful mathematical tool that is extensively used in mathematics and computer science. We devise a new method of using metric embeddings recursively that turned out to be particularly effective for $\ell_p$ spaces, $p>2$. Our method yields state-of-the-art results for Lipschitz decomposition, nearest neighbor search and embedding into $\ell_2$. In a nutshell, we compose metric embeddings by way of reductions, leading to new reductions that are substantially more effective than the straightforward reduction that employs a single embedding. In fact, we compose reductions recursively, oftentimes using double recursion, which exemplifies this gap.