Recursive lower bounds for uniform set systems of bounded VC-dimension

Abstract

For integers n d+1, let Md(n) denote the maximum size of a (d+1)-uniform family on an n-element ground set with VC-dimension at most d. For n2d+2, the classical construction of Ahlswede and Khachatrian, later generalized by Mubayi and Zhao, gives \[ Md(n) n-1d+n-4d-2. \] We introduce a two-cover lifting construction and prove the recursive lower bound \[ Md(n) n-1d+n-4d-2+Md-3(n-5) \] for every d 3 and n d+3. Consequently, \[ Md(n) n-1d+n-4d-2+n-6d-3. \] Thus the Mubayi--Zhao conjecture on the exact value of Md(n) for n2(d+2) is false for any d 3. The proof is elementary and proceeds entirely through an explicit analysis of traces.