Right edge rates of the zeros of n and n

Abstract

We consider the two families of even polynomials n and n studied in~TallaWaffo2026arxiv2602.16761, together with the rescaled polynomials n(x):=n(x) and n(x):=n(x), n2. Their zeros are real, simple, and contained in (0,1). Writing them as 0<x()1,n<·s<x()n-1,n<1 and 0<x()1,n<·s<x()n-1,n<1, we study the asymptotic behaviour of the largest zeros x()n-1,n and x()n-1,n. We prove that the two families have different exponential rates at the right endpoint: \[ 1n-1(1-x()n-1,n)-4, 1n-1(1-x()n-1,n)-9. \] Thus, although the two families share the same global limiting zero distribution, their extreme right zeros approach 1 on different exponential scales. The proof is based on the representation of n and n in terms of Eulerian polynomials of type~B and type~A, respectively, and on an elementary estimate for the smallest negative zero in terms of the first non-constant coefficient.