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W1985166099 abstract "(2) O(M)= t, +(8)(t)= 0 (s= 1 2,*** ,r1), then +(x) is said to define an iteration of order r to the root t. In fact, for r> 1, when xo is in a sufficiently small neighborhood of t the sequence (3) x+1 = 4(xi) converges to t with (4) = + O(xi O)r For analyticf, iterations of all orders exist and can be constructed in many ways. Domb [2]1 has shown further that for polynomial f it is always possible to make k a polynomial. The purpose of this note is to describe a simple algorithm: Let f(x) be a polynomial with no multiple factors; let p(x) and q(x) be any polynomials satisfying" @default.
W1985166099 created "2016-06-24" @default.
W1985166099 creator A5049405854 @default.
W1985166099 date "1951-05-01" @default.
W1985166099 modified "2023-09-25" @default.
W1985166099 title "Polynomial iterations to roots of algebraic equations" @default.
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W1985166099 doi "https://doi.org/10.1090/s0002-9939-1951-0043261-2" @default.
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