PIPELINE MULTIPLIER OF POLYNOMIALS MODULO WITH ANALYSIS OF HIGH-ORDER BITS OF THE MULTIPLIER-Reference-Cited by-同舟云学术

PIPELINE MULTIPLIER OF POLYNOMIALS MODULO WITH ANALYSIS OF HIGH-ORDER BITS OF THE MULTIPLIER

Published:2020-08-15 Issue:4 Volume:386 Page:13-20
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Container-title:THE BULLETIN
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Author:

Kalimoldayev M.¹^ORCID,Tynymbayev S.²^ORCID,Ibraimov M.³^ORCID,Magzom M.⁴^ORCID,Kozhagulov Y.⁵^ORCID,Namazbayev T.⁶^ORCID

Affiliation:

1. Director general of Institute of Information and Computational Technologies, Doctor of sciences, professor, academician member of the National Academy of Science of the Republic of Kazakhstan, Almaty, Kazakhstan; mnk@ipic.kz;

2. Professor of the Department of Information security systems, Candidate of Technical Sciences, Almaty University of Power Engineering and Telecommunication, Almaty, Kazakhstan, e-mail: s.tynym@mail.ru;

3. Lead researcher, PhD, Head of Department of Physics and Technology, Al-Farabi Kazakh National University, Almaty, Kazakhstan; margulan.ibraimov@kaznu.kz;

4. Senior researcher, PhD, Institute of Information and Computational Technologies, Almaty,Kazakhstan; magzomxzn@gmail.com;

5. Lead researcher, PhD, Lecturer of Department of Physics and Technology, al-Farabi Kazakh national university, Almaty, Kazakhstan; kazgu.kz@gmail.com;

6. Senior Lecturer of the Department of Solid state physics and Nonlinear Physics, Master of Engineering Science, al-Farabi Kazakh National University, Almaty, Kazakhstan, e-mail: tirnagog@mail.ru;

Abstract

Among public-key cryptosystems, cryptosystems built on the basis of a polynomial system of residual classes are special. Because in these systems, arithmetic operations are performed at high speed. There are many algorithms for encrypting and decrypting data presented in the form of polynomials. The paper considers data encryption based on the multiplication of polynomials modulo irreducible polynomials. In such a multiplier, the binary image of a multiply polynomial can serve as a fragment of encrypted text. The binary image of the multiplier polynomial is the secret key and the binary representation of the irreducible polynomial is the module. Existing sequential polynomial multipliers and single-cycle matrix polynomial multipliers modulo do not provide the speed required by the encryption block. The paper considers the possibility of multiplying polynomials modulo on a Pipeline in which architectural techniques are laid in order to increase computing performance. In the conclusion of the work, the time gain of the multiplication modulo is shown by the example of the multiplication of five triples of polynomials. Verilog language was used to describe the scheme of the Pipeline multiplier. Used FPGA Artix-7 from Xilinx companies. The developed Pipeline multiplier can be used for cryptosystems based on a polynomial system of residual classes, which can be implemented in hardware or software.

Publisher

National Academy of Sciences of the Republic of Kazakshtan

Link

http://www.bulletin-science.kz/assets/2020-4/13-20.pdf

Reference8 articles.

1. Magzom M. Development and research of cryptosystems for information security in decentralized networks. PhD Dissertation [Razrabotka i issledovanie kriptosistem zashchity informatsii v detsentralizovannykh setiakh. PhD Dissertation]. Almaty, 2017 (in Russ.).

2. Tynymbayev S., Kapalova N. Polynomial multipliers on the module of irreducible polynomials sequential action [Umnozhitel' polinomov po moduliu neprivodimykh polinomov posledovatel'nogo deistviia]. Materials of the 2nd international scientific-practical conference “Informatics and applied mathematics”. Almaty 2017 (in Russ.).

3. Kalimoldayev M., Tynymbaev S., Magzom M., Ibraimov M., Khokhlov S., Sydorenko V. Polynomials Multiplier under Irreducible Polynomial Module for High-Performance Cryptographic Hardware Tools. Proc. Of 15th International Conference on ICT in Education, Research and Industrial Applications // Integration, Harmonization and Knowledge Transfer. Kherson, Ukraine, June 12-15, 2019. P. 729-757.

4. Kalimoldayev M., Tynymbayev S., Kapalova N. Polynomial multipliers on the module of irreducible polynomials // Bulletin of National Academy of Sciences of the Republic of Kazakhstan. Vol. 4, N 368 (2017). P. 48-53.

5. Kalimoldayev M., Tynymbayev S., Gnatyuk S., Ibraimov M., Magzom M. The device for multiplying polynomials modulo an irreducible polynomial // News of The National Academy of Sciences of the Republic of Kazakhstan Series of Geology and Technical Sciences. Vol. 2, N 434 (2019). P. 199-205. DOI: 10.32014/2019.2518-170X.55