Ramsey-Turán Type Problem for Perfect Transitive Triangle Tilings in Digraphs

Abstract

The classical Corrádi-Hajnal theorem states that for any multiple n of 3, if G is a graph with n vertices and δ(G) ≥ 2n/3, then G can be partitioned into n/3 vertex-disjoint copies of the triangle [Acta Math. Acad. Sci. Hung., 14:423-439, 1964]. Balogh, Molla and Sharifzadeh obtained a smaller lower bound by adding the independence number condition [Random Struct. Algorithms, 49:669-693, 2016]. In this paper, we study perfect tilings in digraphs subject to conditions on the independence number and the degree. The independence number, α(D), of D is the maximum integer k such that D has an independent set of cardinality k. We show that if D is an n-vertex digraph with α(D)≤ o(1)n and δ(D) ≥ (1+o(1))n, then D has a perfect T3-tiling, where T3 denotes a transitive triangle. This minimum degree condition is asymptotically best possible. Moreover, our result implies the theorem of Balogh, Molla, and Sharifzadeh concerning perfect triangle tilings.