Terence Tao
Published 2005-03-24, updated 2005-11-16Version 2
Recent work of Gowers and Nagle, R\"odl, Schacht, and Skokan has established a hypergraph removal lemma, which in turn implies some results of Szemer\'edi and Furstenberg-Katznelson concerning one-dimensional and multi-dimensional arithmetic progressions respectively. In this paper we shall give a self-contained proof of this hypergraph removal lemma. In fact we prove a slight strengthening of the result, which we will use in a subsequent paper to establish infinitely many constellations of a prescribed shape in the Gaussian primes.
Comments: 25 pages, no figures, to appear, J. Combin. Thy A. This is the final version, incorporating the referee's comments
Hypergraph Removal Lemmas via Robust Sharp Threshold Theorems
The Gaussian primes contain arbitrarily shaped constellations
General removal lemma
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