A solution to Csikvári's conjecture and the largest matching root of k-graphs

Abstract

In 2011, Csikvári [Electron. J. Combin. 18 (2011), \#P182] proved that among all graphs with a prescribed number of edges, the largest matching root is attained by a threshold graph, and conjectured that the extremal graph should be `as star-like as possible.' In this paper, we give a complete and affirmative answer to this problem and extend it to the setting of uniform hypergraphs. We prove that for every k-graph H with m edges, its largest matching root satisfies λ(H) m1/k, with equality if and only if H is intersecting. For k=2, after deleting all isolated vertices, the resulting graph must be the star K1,m or a triangle, thereby confirming Csikvári's conjecture. Moreover, if the matching number ν(H) 2, then \[ λ(H) (m+m2-4(ν(H)-1)2)1/k, \] with equality if and only if ν(H)=2 and H has exactly one 2-matching.