Matches in DBpedia 2016-04 for { ?s ?p "The Aberth method, or Aberth–Ehrlich method, named after Oliver Aberth and Louis W. Ehrlich, is a root-finding algorithm for simultaneous approximation of all the roots of a univariate polynomial.The fundamental theorem of algebra states that for each polynomial with complex coefficients there are as many roots as the degree of the polynomial. This method converges cubically, an improvement over the Weierstrass–(Durand–Kerner) method, another numerical algorithm that approximates all roots at once, which converges quadratically. (However, both algorithms converge linearly at multiple zeros.)"@en }
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- Aberth_method abstract "The Aberth method, or Aberth–Ehrlich method, named after Oliver Aberth and Louis W. Ehrlich, is a root-finding algorithm for simultaneous approximation of all the roots of a univariate polynomial.The fundamental theorem of algebra states that for each polynomial with complex coefficients there are as many roots as the degree of the polynomial. This method converges cubically, an improvement over the Weierstrass–(Durand–Kerner) method, another numerical algorithm that approximates all roots at once, which converges quadratically. (However, both algorithms converge linearly at multiple zeros.)".
- Q4667181 abstract "The Aberth method, or Aberth–Ehrlich method, named after Oliver Aberth and Louis W. Ehrlich, is a root-finding algorithm for simultaneous approximation of all the roots of a univariate polynomial.The fundamental theorem of algebra states that for each polynomial with complex coefficients there are as many roots as the degree of the polynomial. This method converges cubically, an improvement over the Weierstrass–(Durand–Kerner) method, another numerical algorithm that approximates all roots at once, which converges quadratically. (However, both algorithms converge linearly at multiple zeros.)".