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Euler-Seidel method for certain combinatorial numbers and a new characterization of Fibonacci sequence

István MezőAyhan Dil — 2009

Open Mathematics

In this paper we use the Euler-Seidel method for deriving new identities for hyperharmonic and r-Stirling numbers. The exponential generating function is determined for hyperharmonic numbers, which result is a generalization of Gosper’s identity. A classification of second order recurrence sequences is also given with the help of this method.

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