A sharper log-convexity inequality for Bell numbers
Abstract
We prove a stronger version of the log-convexity inequality for the Bell numbers Bn. In particular, for n 5, we have \[ Bn+1Bn-1 - (Bn)2 Σi=1n Fi (Bn-i)2, \] where Fi is the i-th Fibonacci number with F0=F1=1. The simple proof is mostly combinatorial with elementary inequalities.
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