On monotonicity of some combinatorial sequences
Abstract
We confirm Sun's conjecture that (n+1Fn+1/nFn)n 4 is strictly decreasing to the limit 1, where (Fn)n0 is the Fibonacci sequence. We also prove that the sequence (n+1Dn+1/nDn)n3 is strictly decreasing with limit 1, where Dn is the n-th derangement number. For m-th order harmonic numbers Hn(m)=Σk=1n 1/km\ (n=1,2,3,…), we show that (n+1H(m)n+1/nH(m)n)n3 is strictly increasing.
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