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rational function (plural rational functions)

  1. (mathematics, complex analysis, algebraic geometry) Any function expressible as the quotient of two (coprime) polynomials (and which thus has poles at a finite, discrete set of points which are the roots of the denominator).
    • 1960, J. L. Walsh, Interpolation and Approximation by Rational Functions in the Complex Domain, 3rd edition, American Mathematical Society, page 184:
      Our first problem is that of interpolation in prescribed points to a given function by a rational function whose poles are given.
    • 1970, Ellis Horowitz, Algorithms for Symbolic Integration of Rational Functions, University of Wisconsin-Madison, page 24:
      By Theorem 2.3.2., we have that the right-hand side of this equation can be equal to a rational function only if that rational function is equal to zero.
    • 2000, Alan F. Beardon, Iteration of Rational Functions: Complex Analytic Dynamical Systems, Springer, page 45:
      Let   be the class of continuous maps of   into itself and let   be the subclass of rational functions. [] Now   is a closed subset of   because if the rational functions   converge uniformly to   on the complex sphere, then   is analytic on the sphere and so it too is rational.

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