A q-Analogue of Faulhaber's Formula for Sums of Powers
Abstract
Let Sm,n(q):=Σk=1n1-q2k1-q2 (1-qk1-q)m-1qm+12(n-k). Generalizing the formulas of Warnaar and Schlosser, we prove that there exist polynomials Pm,k(q)∈Z[q] such that S2m+1,n(q) =Σk=0m(-1)kPm,k(q) (1-qn)m+1-k(1-qn+1)m+1-kqkn (1-q2)(1-q)2m-3kΠi=0k(1-qm+1-i), and solve a problem raised by Schlosser. We also show that there is a similar formula for the following q-analogue of alternating sums of powers: Tm,n(q):=Σk=1n(-1)n-k (1-qk1-q)mqm2(n-k).
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