Transversal tilings in k-partite graphs without large holes

Abstract

We show that for any constant μ>0 and k 3, there exists α>0 such that the following holds for sufficiently large n ∈ N. If G=(V1,…,Vk,E) is a spanning subgraph of the n-blow-up of Kk with δ*(G)≥ (12+μ) n and α*k-1(G)<α n, then G has a transversal Kk-factor. Moreover, the bound 12 is asymptotically tight for the case \(k=3\). In addition, we show that if k 4, G=(V1,…,Vk,E) is a spanning subgraph of the n-blow-up of Ck with δ*(G) (2k+μ) n, and α*2(G)<α n, then G has a transversal Ck-factor. This extends a recent result of Han, Hu, Ping, Wang, Wang and Yang.