Polynomial reduction for q-holonomic sequences

Abstract

This paper provides a (Laurent) polynomial reduction to q-holonomic sequences Fk(q). We first characterize Laurent polynomials p(x) such that the product p(qk)Fk(q) is summable. Then the reduction framework is given to decompose any given Laurent polynomial into a summable part and a remainder with lower degree. Finally, we introduce a power-partible reduction for q-holonomic sequences of which the recurrence relation satisfies a certain symmetry condition. The advantage is that it can not only simultaneously eliminate the highest-degree and lowest-degree terms of a Laurent polynomial satisfying a symmetry condition, but also guarantee the symmetry of the remainder. As applications, we apply the reduction to q-central-Delannoy numbers to derive new q-identities and q-congruences.