An Approximation Formula for Nielsen’s Beta Function Involving the Trigamma Function

We prove that the function σ ( s ) defined by β ( s ) = 6 s 2 + 12 s + 5 3 s 2 ( 2 s + 3 ) − ψ ′ ( s ) 2 − σ ( s ) 2 s 5 , s > 0 , is strictly increasing with the sharp bounds 0 < σ ( s ) < 49 120 , where β ( s ) is Nielsen’s beta function and ψ ′ ( s ) is the trigamma function. Furthermore, we prove that the two functions s ↦ ( − 1 ) 1 + μ β ( s ) − 6 s 2 + 12 s + 5 3 s 2 ( 2 s + 3 ) + ψ ′ ( s ) 2 + 49 μ 240 s 5 , μ = 0 , 1 are completely monotonic for s > 0 . As an application, double inequality for β ( s ) involving ψ ′ ( s ) is obtained, which improve some recent results.