Robust Recovery of Robinson Property in Lp-Graphons: A Cut-Norm Approach

Abstract

This paper investigates the Robinson graphon completion/recovery problem within the class of Lp-graphons, focusing on the range 5<p≤ ∞. A graphon w is Robinson if it satisfies the Robinson property: if x≤ y≤ z, then w(x,z)≤ \w(x,y),w(y,z)\. We demonstrate that if a graphon possesses localized near-Robinson characteristics, it can be effectively approximated by a Robinson graphon in terms of cut-norm. To achieve this recovery result, we introduce a function , defined on the space of Lp-graphons, which quantifies the degree to which a graphon w adheres to the Robinson property. We prove that is a suitable gauge for measuring the Robinson property when proximity of graphons is understood in terms of cut-norm. Namely, we show that (1) (w)=0 precisely when w is Robinson; (2) is cut-norm continuous, in the sense that if two graphons are close in the cut-norm, then their values are close; and (3) for p > 5, any Lp-graphon w can be approximated by a Robinson graphon, with error of the approximation bounded in terms of (w). When viewing w as a noisy version of a Robinson graphon, our method provides a concrete recipe for recovering a cut-norm approximation of a noiseless w. Given that any symmetric matrix is a special type of graphon, our results can be applicable to symmetric matrices of any size. Our work extends and improves previous results, where a similar question for the special case of L∞-graphons was answered.