Go to DBLP homepageA Cryptographic View of Regularity Lemmas: Simpler Unified Proofs and Refined Bounds
Abstract: In this work we present a short and unified proof for the Strong and Weak Regularity Lemma, based on the cryptographic technique called low-complexity approximations. In short, both problems reduce to a task of finding constructively an approximation for a certain target function under a class of distinguishers (test functions), where distinguishers are combinations of simple rectangle-indicators. In our case these approximations can be learned by a simple iterative procedure, which yields a unified and simple proof, achieving for any graph with density d and any approximation parameter \(\epsilon \) the partition size
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