What do sin(x) and arcsinh(x) have in Common?

Abstract

N. G. de Bruijn (1958) studied the asymptotic expansion of iterates of sin(x) with 0 < x ≤ π/2. Bencherif & Robin (1994) generalized this result to increasing analytic functions f(x) with an attractive fixed point at 0 and x > 0 suitably small. Mavecha & Laohakosol (2013) formulated an algorithm for explicitly deriving required parameters. We review their method, testing it initally on the logistic function (x), a certain radical function r(x), and later on several transcendental functions. Along the way, we show how (x) and r(x) are kindred functions; the same is also true for sin(x) and arcsinh(x).

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