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The radius of univalence of the function exp\(z^2 \mathop \smallint \limits_0^z \) exp (−t 2)dt

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References

  1. Luke, Y. L.: The Padé Table and the τ-Method. J. Math. Phys.37, 110–127 (1958).

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  2. Kreyszig, E., andJ. Todd: On the Radius of Univalence of the Function\(z^2 \mathop \smallint \limits_0^z \) exp (−t 2)dt. Pacific J. Math.9, 123–127 (1959).

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  3. Kreyszig, E., andJ. Todd: The Radius of Univalence of the Error Function. Numer. Math.1, 78–89 (1959).

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  4. Luke, Y. L.: Expansion of the Confluent Hypergeometric Function in Series of Bessel Functions. Math. Tables and Other Aids to Computation13, 261–271 (1959).

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  1. Midwest Research Institute, 425 Volker Boulevard, Kansas City 10, Missouri

    Yudell L. Luke

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  1. Yudell L. Luke
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Luke, Y.L. The radius of univalence of the function exp\(z^2 \mathop \smallint \limits_0^z \) exp (−t 2)dt . Numer. Math. 3, 76–78 (1961). https://doi.org/10.1007/BF01386003

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  • DOI: https://doi.org/10.1007/BF01386003

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