The q-Log-convexity of the Generating Functions of the Squares of Binomial Coefficients

Abstract

We prove a conjecture of Liu and Wang on the q-log-convexity of the polynomial sequence \Σk=0nn k2qk\n≥ 0. By using Pieri's rule and the Jacobi-Trudi identity for Schur functions, we obtain an expansion of a sum of products of elementary symmetric functions in terms of Schur functions with nonnegative coefficients. Then the principal specialization leads to the q-log-convexity. We also prove that a technical condition of Liu and Wang holds for the squares of the binomial coefficients. Hence we deduce that the linear transformation with respect to the triangular array \n k2\0≤ k≤ n is log-convexity preserving.