Fundamentals of Numerical Mathematics for Physicists and Engineers. Alvaro Meseguer. Читать онлайн. Newlib. NEWLIB.NET

Автор: Alvaro Meseguer
Издательство: John Wiley & Sons Limited
Серия:
Жанр произведения: Математика
Год издания: 0
isbn: 9781119425755
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alt="Graphs depict (a) the analysis of the order of convergence of the Newton's method with the points (Xk,Yk) seem to align with a straight line of slope p equal to two described by dashed line and the (b) same analysis for chord and secant methods, showing linear and golden ratio orders, respectively."/>

      (1.15)equation

      Before calculating the limit above, first notice that Newton's iteration images can be expressed in terms of the errors images. Since images we may write

equation

      and therefore

equation

      Since images when images, we may define images as a continuous variable that approaches zero so that we can rewrite the previous limit as

equation

      where we have used L'Hôpital's rule to solve the indeterminate form images. Therefore we conclude that Newton's method has quadratic convergence with asymptotic error constant

      Assume that we have identified an interval images such that images. The key point is to provide an estimation images of the slope images of the function at the imagesth iterate and substitute Newton's iteration by

      Chord Iteration:

      (1.18)equation

      The chord method can be improved by updating images at every iteration with a new quantity images obtained from the values of the imagesth iterates images and their images images obtained at the previous stages images and images:

      (1.19)equation

      so that (1.17) now leads to the secant method:

      Secant Iteration:

      (1.20)equation

      It is common practice to start the indexing at images by taking the initial values images and images, so that the first iterate images is the same as the one obtained with the chord method. It should be clear that both chord and secant methods involve just the new evaluation images per iteration, the remaining terms being previously computed (and stored) in the past.