Detection and Reconstruction of a Random Hypergraph from Noisy Graph Projection

Abstract

For a d-uniform random hypergraph on n vertices in which hyperedges are included i.i.d.\ so that the average degree in the hypergraph is nδ+o(1), the projection of such a hypergraph is a graph on the same n vertices where an edge connects two vertices if and only if they belong to a same hyperedge. In this work, we study the inference problem where the observation is a noisy version of the graph projection where each edge in the projection is kept with probability p=n-1+α+o(1) and each edge not in the projection is added with probability q=n-1+β+o(1). For all constant d, we establish sharp thresholds for both detection (distinguishing the noisy projection from an Erdos-R\'enyi random graph with edge density q) and reconstruction (estimating the original hypergraph). Notably, our results reveal a detection-reconstruction gap phenomenon in this problem. Our work also answers a problem raised in BGPY25+.