Rainbow matchings in properly-colored hypergraphs
Abstract
A hypergraph H is properly colored if for every vertex v∈ V(H), all the edges incident to v have distinct colors. In this paper, we show that if H1, ·s, Hs are properly-colored k-uniform hypergraphs on n vertices, where n≥3k2s, and e(Hi)>n k-n-s+1 k, then there exists a rainbow matching of size s, containing one edge from each Hi. This generalizes some previous results on the Erdos Matching Conjecture.
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