Improved Bounds on Rainbow k-partite Matchings

Abstract

Let n, s, and k be positive integers. We say that a sequence f1,…,fs of nonnegative integers is satisfying if for any collection of s families F1,…, Fs⊂eq [n]k such that | Fi|=fi for all i, there exists a rainbow matching, i.e., a list of pairwise disjoint tuples F1∈ F1, …, Fs∈ Fs. We investigate the question, posed by Kupavskii and Popova, of determining the smallest c=c(n,s,k) such that the arithmetic progression c, nk-1+c, 2nk-1+c, …, (s-1)nk-1+c is satisfying. We prove that the sequence is satisfying for c=k((s2nk-2, snk-3/2 s)), improving the previous result by Kupavskii and Popova. We also study satisfying sequences for k=2 using the polynomial method, extending the previous result by Kupavskii and Popova to when n is not prime.