Number systems in modular rings and their applications to ”error-free” computations
Автор: Ckernov Vladimir Mikhailovich
Журнал: Компьютерная оптика @computer-optics
Рубрика: Численные методы и анализ данных
Статья в выпуске: 5 т.43, 2019 года.
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The article introduces and explores new systems of parallel machine arithmetic associated with the representation of data in the redundant number system with the basis, the formative sequences of degrees of roots of the characteristic polynomial of the second order recurrence. Such number systems are modular reductions of generalizations of Bergman's number system with the base equal to the "Golden ratio". The associated Residue Number Systems is described. In particular, a new "error-free" algorithm for calculating discrete cyclic convolution is proposed as an application to the problems of digital signal processing. The algorithm is based on the application of a new class of discrete orthogonal transformations, for which there are effective “multipication-free” implementations.
Number system, modular arithmetic, discrete convolution, residue number systems
Короткий адрес: https://sciup.org/140246524
IDR: 140246524 | DOI: 10.18287/2412-6179-2019-43-5-901-911