Note on the second derivative of bounded analytic functions
Abstract
Assume z0 lies in the open unit disk D and g is an analytic self-map of D. We will determine the region of values of g''(z0) in terms of z0, g(z0) and the hyperbolic derivative of g at z0, and give the form of all the extremal functions. In particular, we obtain a smaller sharp upper bound for |g''(z0)| than Ruscheweyh's inequality for the case of the second derivative. Moreover, we use a different method to obtain Sz\'asz's inequality, which provides a sharp upper bound for |g''(z0)| depending only on |z0|.
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