Ramsey numbers and the Zarankiewicz problem

Abstract

Building on recent work of Mattheus and Verstra\"ete, we establish a general connection between Ramsey numbers of the form r(F,t) for F a fixed graph and a variant of the Zarankiewicz problem asking for the maximum number of 1s in an m by n 0/1-matrix that does not have any matrix from a fixed finite family L(F) derived from F as a submatrix. As an application, we give new lower bounds for the Ramsey numbers r(C5,t) and r(C7,t), namely, r(C5,t) = (t107) and r(C7,t) = (t54). We also show how the truth of a plausible conjecture about Zarankiewicz numbers would allow an approximate determination of r(C2+1, t) for any fixed integer ≥ 2.