On a Quadratic Relation Between Stanley-Wilf Limits and F\"uredi-Hajnal Limits

Abstract

For a permutation matrix P, let sP denote its Stanley-Wilf limit, the exponential growth rate of the number of n× n permutation matrices avoiding P. Let cP denote its F\"uredi-Hajnal limit, which is the limit n ∞ ex(n,P)/n where ex(n,P) is the maximum number of ones in an n× n 0-1 matrix avoiding P. Cibulka proved the universal quadratic bound sP≤ 2.88\,cP2. In this note we improve the constants in Cibulka's result through a so-called ``block contraction" argument. Defining \[ F(c)=∈ft∈N (t!)1/t\,15\,c/tc, \] for c>0, this leads us to the revised inequality sP≤ F(cP)\,cP2. In particular, F(c)= 15+o(1) ≈ 2.70805… +o(1) as c∞, and the constant improves 2.88 once cP ≥ 17.