Confirming Two Conjectures of Su and Wang

Abstract

Two conjectures of Su and Wang (2008) concerning binomial coefficients are proved. For n≥ k≥ 0 and b>a>0, we show that the finite sequence Cj=n+jak+jb is a P\'olya frequency sequence. For n≥ k≥ 0 and a>b>0, we show that there exists an integer m≥ 0 such that the infinite sequence n+jak+jb, j=0, 1,..., is log-concave for 0≤ j≤ m and log-convex for j≥ m. The proof of the first result exploits the connection between total positivity and planar networks, while that of the second uses a variation-diminishing property of the Laplace transform.