Jointly maximal products in weighted growth spaces
Abstract
It is shown that for any non-decreasing, continuous and unbounded doubling function on [0,1), there exist two analytic infinite products f0 and f1 such that the asymptotic relation |f0(z)| + |f1(z)| (|z|) is satisfied for all z in the unit disc. It is also shown that both functions fj for j=0,1 satisfy T(r,fj)ω(r), as r1-, and hence give examples of analytic functions for which the Nevanlinna characteristic admits the regular slow growth induced by ω.
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