The Bojanov--Naidenov inequality for quartics and second derivatives

Abstract

We settle the case n=4, k=2 of the Bojanov--Naidenov problem for algebraic polynomials. Let P be a real polynomial of degree at most four with PC[-1,1]≤ 1, and let T4(x)=8x4-8x2+1. We prove that, for every t≥0, \[ ∫-11 (|P''(x)|-t)+\,dx ≤ ∫-11 (|T4''(x)|-t)+\,dx . \] This tail estimate implies \[ ∫-11φ(|P''(x)|)\,dx ≤ ∫-11φ(|T4''(x)|)\,dx \] for every nondecreasing convex function φ:[0,∞). If φ is strictly increasing and convex, equality can occur only for P= T4. The proof is elementary and finite. We interpolate at the five extremal points of T4; convexity then reduces the problem to the 32 sign choices at these nodes. At each vertex the second derivative is a quadratic polynomial, so the remaining work is an explicit comparison of level sets.