On a conjecture of Stein
Abstract
Stein proposed the following conjecture: if the edge set of Kn,n is partitioned into n sets, each of size n, then there is a partial rainbow matching of size n-1. He proved that there is a partial rainbow matching of size n(1-Dnn!), where Dn is the number of derangements of [n]. This means that there is a partial rainbow matching of size about (1- 1e)n. Using a topological version of Hall's theorem we improve this bound to 23n.
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