Log-Concavity and Infinite Log-Concavity of Linear Recurrent Sequences with Linear Coefficients via Companion Matrix Methods

Abstract

We study log-concavity properties of real sequences (an)n 0 satisfying a d-th order linear recurrence whose coefficients are linear functions of n; the so-called P-recursive (or holonomic) sequences. Writing the recurrence in companion-matrix form vn+1 = Mn\,vn with Mn = nA + B, we show that the log-concave operator value L(an) = bn an2 - an+1an-1 is a quadratic form in the state vector vn, and identify the matrix Qn = Q(0) + nQ(1) whose positive semi-definiteness gives a sufficient condition for log-concavity. For the class of second-order recurrences with constant coefficients, we prove a tight (necessary and sufficient) criterion for the sequence to be ∞-log-concave, a consequence of the fact that L(an) is itself a geometric sequence so that L2(an) = 0 identically. We obtain analogous tight criteria for sequences fixed by L, and for P-recursive sequences satisfying a dominant-root asymptotic behaviour. We leave some further insight in case this criteria break down in full generality.