Covering hypergraphs are eulerian
Abstract
An Euler tour in a hypergraph (also called a rank-2 universal cycle or 1-overlap cycle in the context of designs) is a closed walk that traverses every edge exactly once. In this paper, we define a covering k-hypergraph to be a non-empty k-uniform hypergraph in which every (k-1)-subset of vertices appear together in at least one edge. We then show that every covering k-hypergraph, for k≥ 3, admits an Euler tour if and only if it has at least two edges.
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