Reconstruction of Line-Embeddings of Graphons

TL;DR

This paper introduces a randomized algorithm for estimating vertex orderings in graphons, achieving near-optimal error rates and improving bounds under certain conditions, with applications to graphon estimation and testing.

Contribution

The paper presents a new randomized algorithm for vertex ordering in graphons that attains optimal error rates and surpasses previous bounds under specific assumptions.

Findings

Achieves $O^{*}( ext{sqrt}(n))$ error rate for large class of graphons.

Breaks the $ ext{sqrt}(n)$ barrier to achieve $O^{*}(n^{ ext{epsilon}})$ under additional assumptions.

Provides improved algorithms for graphon estimation and testing based on seriation bounds.

Abstract

Consider a random graph process with $n$ vertices corresponding to points $v_{i} \sim {Unif}[0,1]$ embedded randomly in the interval, and where edges are inserted between $v_{i}, v_{j}$ independently with probability given by the graphon $w(v_{i},v_{j}) \in [0,1]$. Following Chuangpishit et al. (2015), we call a graphon $w$ diagonally increasing if, for each $x$, $w(x,y)$ decreases as $y$ moves away from $x$. We call a permutation $\sigma \in S_{n}$ an ordering of these vertices if $v_{\sigma(i)} < v_{\sigma(j)}$ for all $i < j$, and ask: how can we accurately estimate $\sigma$ from an observed graph? We present a randomized algorithm with output $\hat{\sigma}$ that, for a large class of graphons, achieves error $\max_{1 \leq i \leq n} | \sigma(i) - \hat{\sigma}(i)| = O^{*}(\sqrt{n})$ with high probability; we also show that this is the best-possible convergence rate for a large class of algorithms and proof strategies. Under an additional assumption that is satisfied by some popular graphon models, we break this "barrier" at $\sqrt{n}$ and obtain the vastly better rate $O^{*}(n^{\epsilon})$ for any $\epsilon > 0$. These improved seriation bounds can be combined with previous work to give more efficient and accurate algorithms for related tasks, including: estimating diagonally increasing graphons, and testing whether a graphon is diagonally increasing.