Juntas in the 1-grid and Lipschitz maps between discrete tori

Abstract

We show that if A ⊂ [k]n, then A is ε-close to a junta depending upon at most (O(|∂ A|/(kn-1ε))) coordinates, where ∂ A denotes the edge-boundary of A in the 1-grid. This is sharp up to the value of the absolute constant in the exponent. This result can be seen as a generalisation of the Junta theorem for the discrete cube, from [E. Friedgut, Boolean functions with low average sensitivity depend on few coordinates, Combinatorica 18 (1998), 27-35], or as a characterization of large subsets of the 1-grid whose edge-boundary is small. We use it to prove a result on the structure of Lipschitz functions between two discrete tori; this can be seen as a discrete, quantitative analogue of a recent result of Austin [T. Austin, On the failure of concentration for the ∞-ball, preprint]. We also prove a refined version of our junta theorem, which is sharp in a wider range of cases.