On Approximability of Satisfiable k-CSPs: VI

Abstract

We prove local and global inverse theorems for general 3-wise correlations over pairwise-connected distributions. Let μ be a distribution over × × such that the supports of μxy, μxz, and μyz are all connected, and let f: n C, g: n C, h: n C be 1-bounded functions satisfying \[ |E(x,y,z) μ n[f(x)g(y)h(z)]| ≥ . \] In this setting, our local inverse theorem asserts that there is δ :=exp(--Oμ(1)) such that with probability at least δ, a random restriction of f down to δ n coordinates δ-correlates to a product function. To get a global inverse theorem, we prove a restriction inverse theorem for general product functions, stating that if a random restriction of f down to δ n coordinates is δ-correlated with a product function with probability at least δ, then f is 2-poly((1/δ))-correlated with a function of the form L· P, where L is a function of degree poly(1/δ), \|L\|2≤ 1, and P is a product function. We show applications to property testing and to additive combinatorics. In particular, we show the following result via a density increment argument. Let be a finite set and S ⊂eq × × such that: (1) (x, x, x) ∈ S for all x ∈ S, and (2) the supports of Sxy, Sxz, and Syz are all connected. Then, any set A ⊂eq n with ||-n|A| ≥ (( n)-c) contains x, y, z ∈ A, not all equal, such that (xi,yi,zi) ∈ S for all i. This gives the first reasonable bounds for the restricted 3-AP problem over finite fields.

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