Computing Clipped Products
Pages 273 - 291
Abstract
Sometimes only some digits of a numerical product or some terms of a polynomial or series product are required. Frequently these constitute the most significant or least significant part of the value, for example when computing initial values or refinement steps in iterative approximation schemes. Other situations require the middle portion. In this paper we provide algorithms for the general problem of computing a given span of coefficients within a product, that is, the terms within a range of degrees for univariate polynomials or range digits of an integer. This generalizes the “middle product” concept of Hanrot, Quercia and Zimmerman. We are primarily interested in problems of modest size where constant speed up factors can improve overall system performance, and therefore focus the discussion on classical and Karatsuba multiplication and how methods may be combined.
References
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- Computing Clipped Products
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Published In
Sep 2024
406 pages
ISBN:978-3-031-69069-3
DOI:10.1007/978-3-031-69070-9
© The Author(s), under exclusive license to Springer Nature Switzerland AG 2024.
Publisher
Springer-Verlag
Berlin, Heidelberg
Publication History
Published: 01 September 2024
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