📝 SummarXiv

Abstract

In this paper, we sample directed random graphs from (asymmetric) step-graphons and investigate the probability that the random graph has at least a Hamiltonian cycle (or a node-wise Hamiltonian decomposition). We show that for almost all step-graphons, the probability converges to either zero or one as the order of the random graph goes to infinity--we term it the zero-one law. We identify the key objects of the step-graphon that matter for the zero-one law, and establish a set of conditions that can decide whether the limiting value of the probability is zero or one.