We provide new communication-efficient distributed interactive proofs for planarity. The notion of a \emph{distributed interactive proof (DIP)} was introduced by Kol, Oshman, and Saxena (PODC 2018). In a DIP, the \emph{prover} is a single centralized entity whose goal is to prove a certain claim regarding an input graph G. To do so, the prover communicates with a distributed \emph{verifier} that operates concurrently on all n nodes of G. A DIP is measured by the amount of prover-verifier communication it requires. Namely, the goal is to design a DIP with a small number of interaction rounds and a small \emph{proof size}, i.e., a small amount of communication per round. Our main result is an O(log∗n)-round DIP protocol for embedded planarity and planarity with a proof size of O(1) and O(⌈logΔ/log∗n⌉), respectively. In fact, this result can be generalized as follows. For any 1≤r≤log∗n, there exists an O(r)-round protocol for embedded planarity and planarity with a proof size of O(log(r)n) and O(log(r)n+logΔ/r), respectively.
@article{arxiv.2510.18592,
title = {Distributed Interactive Proofs for Planarity with Log-Star Communication},
author = {Yuval Gil and Merav Parter},
journal= {arXiv preprint arXiv:2510.18592},
year = {2025}
}