On the q-log-convexity conjecture of Sun
Abstract
In his study of Ramanujan-Sato type series for 1/π, Sun introduced a sequence of polynomials Sn(q) as given by Sn(q)=Σk=0nn k2k k2(n-k) n-kqk, and he conjectured that the polynomials Sn(q) are q-log-convex. By imitating a result of Liu and Wang on generating new q-log-convex sequences of polynomials from old ones, we obtain a sufficient condition for determining the q-log-convexity of self-reciprocal polynomials. Based on this criterion, we then give an affirmative answer to Sun's conjecture.
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