Series and sums involving the floor function
Abstract
Let (an)n≥ 0 be an arbitrary sequence and (a n/k )n≥ 0 its dual floor sequence. We study infinite series and finite generalized binomial sums involving (a n/k )n≥ 0. As applications we prove a range of new closed form expressions for Fibonacci (Lucas) series and binomial sum identities as particular cases.
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