Non-real zeros of higher derivatives of real entire functions of infinite order |
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| Authors: | J. K. Langley |
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| Affiliation: | (1) School of Mathematical Sciences, University of Nottingham, NG7 2RD Nottingham, England |
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| Abstract: | Letf be a real meromorphic function of infinite order in the plane such thatf has finitely many poles. Then for eachk≥3, at least one off andf (k) has infinitely many non-real zeros. Together with a result of Edwards and Hellerstein, this establishes the analogue for higher derivatives of a conjecture going back to Wiman around 1911. |
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