-Log-momotonic and Laguerre Inequality of P-recursive Sequences

Abstract

We consider -log-momotonic sequences and Laguerre inequality of order two for sequences \an\n 0 such that \[ an-1an+1an2 = 1 + Σi=1m ri( n)nαi + o( 1nβ ), \] where m is a nonnegative integer, αi are real numbers, ri(x) are rational functions of x and \[ 0 < α1 < α2 < ·s < αm < β. \] We will give a sufficient condition on -log-momotonic sequences and Laguerre inequality of order two for n sufficiently large. Many P-recursive sequences fall in this frame. At last, we will give a method to find the N such that for any n≥ N, log-momotonic inequality of order three and Laguerre inequality of order two holds.