Abstract
A number of methods of solving sets of linear equations and inverting matrices are discussed. The theory of the rounding-off errors involved is investigated for some of the methods. In all cases examined, including the well-known 'Gauss elimination process', it is found that the errors are normally quite moderate: no exponential build-up need occur.Included amongst the methods considered is a generalization of Choleski's method which appears to have advantages over other known methods both as regards accuracy and convenience. This method may also be regarded as a rearrangement of the elimination process. © 1948 Oxford University Press.
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CITATION STYLE
Turing, A. M. (1948). Rounding-off errors in matrix processes. Quarterly Journal of Mechanics and Applied Mathematics, 1(1), 287–308. https://doi.org/10.1093/qjmam/1.1.287
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