A step towards a general density Corr\'adi--Hajnal Theorem

Abstract

For a nondegenerate r-graph F, large n, and t in the regime [0, cF n], where cF>0 is a constant depending only on F, we present a general approach for determining the maximum number of edges in an n-vertex r-graph that does not contain t+1 vertex-disjoint copies of F. In fact, our method results in a rainbow version of the above result and includes a characterization of the extremal constructions. Our approach applies to many well-studied hypergraphs (including graphs) such as the edge-critical graphs, the Fano plane, the generalized triangles, hypergraph expansions, the expanded triangles, and hypergraph books. Our results extend old results of Simonovits~SI68 and Moon~Moon68 on complete graphs and can be viewed as a step towards a general density version of the classical Corr\'adi--Hajnal Theorem~CH63.