Log-concavity and LC-positivity
Abstract
A triangle \a(n,k)\0 k n of nonnegative numbers is LC-positive if for each r, the sequence of polynomials Σk=rna(n,k)qk is q-log-concave. It is double LC-positive if both triangles \a(n,k)\ and \a(n,n-k)\ are LC-positive. We show that if \a(n,k)\ is LC-positive then the log-concavity of the sequence \xk\ implies that of the sequence \zn\ defined by zn=Σk=0na(n,k)xk, and if \a(n,k)\ is double LC-positive then the log-concavity of sequences \xk\ and \yk\ implies that of the sequence \zn\ defined by zn=Σk=0na(n,k)xkyn-k. Examples of double LC-positive triangles include the constant triangle and the Pascal triangle. We also give a generalization of a result of Liggett that is used to prove a conjecture of Pemantle on characteristics of negative dependence.
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