An iterative procedure based on the Newton-Raphson process for the factorisation (splitting) of a real-coefficient polynomial into two lower-degree polynomials is described in summary, and the method extended to the case where the Jacobian matrix is not updated at each iteration (a 'Quasi-Newton' process). It is demonstrated that a faster process results, and that in the case of a particular class of problems, an optimal rate of update of the Jacobian matrix can be determined. the modified convergence criteria are examined but without proof at this stage.
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