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  • NORMALITY AND SHARED SETS

  • Part of
  • MINGLIANG FANG, LAWRENCE ZALCMAN
  • Journal:
    Journal of the Australian Mathematical Society / Volume 86 / Issue 3 / June 2009
    Published online by Cambridge University Press:
    01 June 2009, pp. 339-354
    Print publication:
    June 2009
    • Article
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  • Let ℱ be a family of meromorphic functions defined in D, all of whose zeros have multiplicity at least k+1. Let a and b be distinct finite complex numbers, and let k be a positive integer. If, for each pair of functions f and g in ℱ, f(k) and g(k) share the set S={a,b}, then ℱ is normal in D. The condition that the zeros of functions in ℱ have multiplicity at least k+1 cannot be weakened.