III.—A Series Formula for the Roots of Algebraic and Transcendental Equations

A. C. Aitken

doi:10.1017/S0370164600024871

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The object of this paper is to communicate a general formula for elementary symmetric functions of any assigned degree of a given number of the roots, in ascending order of magnitude, of an algebraic or transcendental equation with complex coefficients. In virtue of the simple relations that exist between these symmetric functions, the formula gives a literal expression in terms of infinite series for all the roots of an equation. In practice it is generally desirable to transform the equation first into one with roots widely separated in value (e.g. by the root-squaring process) in order to make the convergence of the series sufficiently rapid for satisfactory numerical computation.

References

^{page 15 note *} Schweins, F., Theorie der Differenzen und Differentiale (1825);Google ScholarSirMuir, Thomas, Theory of Determinants, vol. i, part 1, pp. 171–172.Google Scholar

^{page 15 note †} Proc. Edin. Math. Soc., vol. xxxvi (1918), p. 103; or Whittaker, and Robinson, , Calculus of Observations, p. 120.Google Scholar

^{page 16 note *} First given by Wronski, H., Introd. à la philos. des math. (1811), Paris;Google Scholar cf. SirMuir, Thomas, Theory of Determinants, vol. ii, pp. 216–217.Google Scholar

^{page 20 note *} Cf. Whittaker, and Robinson, , Calculus of Observations, pp.113–118.Google Scholar

^{page 20 note †} Cf. Whittaker, and Robinson, , Calculus of Observations, p. 116.Google Scholar

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III.—A Series Formula for the Roots of Algebraic and Transcendental Equations

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