Mapping properties of analytic functions on the disk

Abstract

There is a universal constant 0<r0<1 with the following property. Suppose that f is an analytic function on the unit disk , and suppose that there exists a constant M>0 so that the Euclidean area, counting multiplicity, of the portion of f() which lies over the disk D(f(0),M), centered at f(0) and of radius M, is strictly less than the area of D(f(0),M). Then f must send r0 into D(f(0),M). This answers a conjecture of Don Marshall.

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