Sharp Bounds for the Arc Lemniscate Sine Function
Abstract
The arc lemniscate sine function is given by arcsl(x)=∫0x 11-t4dt. In 2017, Mahmoud and Agarwal presented bounds for arcsl in terms of the Lerch zeta function (z,s,a)=Σk=0∞ zk(k+a)s. They proved 18 \, x \, (x4, 3/2, 1/4) < arcsl(x)< 14 \, x \, (x4,3/2,1/4)(0<x<1). We %use the monotone form of l'Hopital's rule to show that the factor 1/4 can be replaced by arcsl(1)/(1,3/2,1/4)=0.12836.... This constant is best possible.
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