On the Decay of the Fourier Transform and Three Term Arithmetic Progressions
Abstract
In this paper we prove a basic theorem which says that if f : Fpn -> [0,1] has the property that ||f||(1/3) is not too ``large''(actually, it also holds for quasinorms 1/2-δ in place of 1/3), and E(f) = p-n summ f(m) is not too ``small'', then there are lots of triples m,m+d,m+2d such that f(m)f(m+d)f(m+2d) > 0. If f is the indicator function for some set S, then this would be saying that the set has many three-term arithmetic progressions. In principle this theorem can be applied to sets having very low density, where |S| is around pn(1-c) for some small c > 0.
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