Maximum and average valence of meromorphic functions
Abstract
If f is a meromorphic function from the complex plane C to the extended complex plane C , for r > 0 let n(r) be the maximum number of solutions in \z |z| ≤ r \ of f(z) = a for a ∈ C , and let A(r,f) be the average number of such solutions. Using a technique introduced by Toppila, we exhibit a meromorphic function for which r∞ n(r)/A(r,f) ≥ 1.07328.
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