BKM algorithm

The BKM algorithm is a shift-and-add algorithm for computing elementary functions, first published in 1994 by Jean-Claude Bajard, Sylvanus Kla, and Jean-Michel Muller. BKM is based on computing complex logarithms (L-mode) and exponentials (E-mode) using a method similar to the algorithm Henry Briggs used to compute logarithms. By using a precomputed table of logarithms of negative powers of two, the BKM algorithm computes elementary functions using only integer add, shift, and compare operations.

BKM is similar to CORDIC, but uses a table of logarithms rather than a table of arctangents. On each iteration, a choice of coefficient is made from a set of nine complex numbers, 1, 0, −1, i, −i, 1+i, 1−i, −1+i, −1−i, rather than only −1 or +1 as used by CORDIC. BKM provides a simpler method of computing some elementary functions, and unlike CORDIC, BKM needs no result scaling factor. The convergence rate of BKM is approximately one bit per iteration, like CORDIC, but BKM requires more precomputed table elements for the same precision because the table stores logarithms of complex operands.

As with other algorithms in the shift-and-add class, BKM is particularly well-suited to hardware implementation. The relative performance of software BKM implementation in comparison to other methods such as polynomial or rational approximations will depend on the availability of fast multi-bit shifts (i.e. a barrel shifter) or hardware floating point arithmetic.

References

    • Bajard, Jean-Claude; Kla, Sylvanus; Muller, Jean-Michel (August 1994). "BKM: A new hardware algorithm for complex elementary functions" (PDF). IEEE Transactions on Computers. 43 (8): 955–963. doi:10.1109/12.295857. ISSN 0018-9340. Archived from the original on 2017-12-21. Retrieved 2017-12-21.
    • Bajard, Jean-Claude; Imbert, Laurent (1999-11-02). Luk, Franklin T., ed. "Evaluation of Complex Elementary Functions: A New Version of BKM" (PDF). SPIE Proceedings, Advanced Signal Processing Algorithms, Architectures, and Implementations IX. Society of Photo-Optical Instrumentation Engineers (SPIE). 3807. doi:10.1117/12.367631. Retrieved 2018-07-11.
    • Imbert, Laurent; Muller, Jean-Michel; Rico, Fabien (2006-05-24) [2000-06-01, September 1999]. "Radix-10 BKM Algorithm for Computing Transcendentals on Pocket Computers". Journal of VLSI Signal Processing (Research report). Kluwer Academic Publishers / Institut national de recherche en informatique et en automatique (INRIA). 25 (2): 179–186. doi:10.1023/A:1008127208220. ISSN 0922-5773. RR-3754. INRIA-00072908. Theme 2. Archived from the original on 2018-07-11. Retrieved 2018-07-11.
    • Muller, Jean-Michel (2006). Elementary Functions: Algorithms and Implementation (2 ed.). Boston, MA, USA: Birkhäuser. ISBN 978-0-8176-4372-0. LCCN 2005048094.
    • Muller, Jean-Michel (2016-12-12). Elementary Functions: Algorithms and Implementation (3 ed.). Boston, MA, USA: Birkhäuser. ISBN 978-1-4899-7981-0. ISBN 1-4899-7981-6.

    Further reading

    • Jorke, Günter; Lampe, Bernhard; Wengel, Norbert (1989). Arithmetische Algorithmen der Mikrorechentechnik (in German) (1 ed.). Berlin, Germany: VEB Verlag Technik. pp. 280–282. ISBN 3341005153. EAN 9783341005156. MPN 5539165. License 201.370/4/89. Retrieved 2015-12-01.
    • Meggitt, John E. (1961-08-29). "Pseudo Division and Pseudo Multiplication Processes". IBM Journal of Research and Development. Riverton, New Jersey, USA: IBM Corporation (published April 1962). 6 (2): 210–226, 287. doi:10.1147/rd.62.0210. Retrieved 2015-12-01.
    • Chi Chen, Tien (July 1972). "Automatic computation of exponentials, logarithms, ratios and square roots". IBM Journal of Research and Development. San Jose, California, USA; Riverton, New Jersey, USA: IBM San Jose Research Laboratory; IBM Corporation. 16 (4): 380–388. doi:10.1147/rd.164.0380. Retrieved 2015-12-01.
    • Revol, Nathalie; Yakoubsohn, Jean-Claude. "Accelerated Shift-and-Add algorithms" (PDF). Boston, USA: Laboratoire d'Analyse Numérique et d'Optimisation (ANO) de l'Université des Sciences et Technologies de Lille; Kluwer Academic Publishers. Archived (PDF) from the original on 2017-12-21. Retrieved 2017-12-21.
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