On some patterns of TNAF for scalar multiplication over Koblitz curve

A τ-adic non-adjacent form (TNAF) of an element α of the ring Z(τ) is an expansion whereby the digits are generated by iteratively dividing α by τ, allowing the remainders of -1,0 or 1. The application of TNAF as a multiplier of scalar multiplication (SM) on the Koblitz curve plays a key role in Ell...

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Main Authors:	Yunos, Faridah, Rosli, Rosimah, Muslim, Norliana
Format:	Article
Published:	Faculty of Science, University of Malaya 2022
Online Access:	http://psasir.upm.edu.my/id/eprint/102385/ https://mjs.um.edu.my/index.php/MJS/article/view/34829
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Institution:	Universiti Putra Malaysia

id	my.upm.eprints.102385
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spelling	my.upm.eprints.1023852023-07-10T02:10:58Z http://psasir.upm.edu.my/id/eprint/102385/ On some patterns of TNAF for scalar multiplication over Koblitz curve Yunos, Faridah Rosli, Rosimah Muslim, Norliana A τ-adic non-adjacent form (TNAF) of an element α of the ring Z(τ) is an expansion whereby the digits are generated by iteratively dividing α by τ, allowing the remainders of -1,0 or 1. The application of TNAF as a multiplier of scalar multiplication (SM) on the Koblitz curve plays a key role in Elliptical Curve Cryptography (ECC). There are several patterns of TNAF (α) expansion in the form of {equation presented} and 8k1+8k2that have been produced in prior work in the literature. However, the construction of their properties based upon pyramid number formulas such as Nichomacus's theorem and Faulhaber's formula remains to be rather complex. In this work, we derive such types of TNAF in a more concise manner by applying the power of Frobenius map (τm) based on v-simplex and arithmetic sequences. Faculty of Science, University of Malaya 2022-09-30 Article PeerReviewed Yunos, Faridah and Rosli, Rosimah and Muslim, Norliana (2022) On some patterns of TNAF for scalar multiplication over Koblitz curve. Malaysian Journal of Science, 41 (1 spec.). pp. 9-16. ISSN 1394-3065 https://mjs.um.edu.my/index.php/MJS/article/view/34829 10.22452/mjs.sp2022no1.2
institution	Universiti Putra Malaysia
building	UPM Library
collection	Institutional Repository
continent	Asia
country	Malaysia
content_provider	Universiti Putra Malaysia
content_source	UPM Institutional Repository
url_provider	http://psasir.upm.edu.my/
description	A τ-adic non-adjacent form (TNAF) of an element α of the ring Z(τ) is an expansion whereby the digits are generated by iteratively dividing α by τ, allowing the remainders of -1,0 or 1. The application of TNAF as a multiplier of scalar multiplication (SM) on the Koblitz curve plays a key role in Elliptical Curve Cryptography (ECC). There are several patterns of TNAF (α) expansion in the form of {equation presented} and 8k1+8k2that have been produced in prior work in the literature. However, the construction of their properties based upon pyramid number formulas such as Nichomacus's theorem and Faulhaber's formula remains to be rather complex. In this work, we derive such types of TNAF in a more concise manner by applying the power of Frobenius map (τm) based on v-simplex and arithmetic sequences.
format	Article
author	Yunos, Faridah Rosli, Rosimah Muslim, Norliana
spellingShingle	Yunos, Faridah Rosli, Rosimah Muslim, Norliana On some patterns of TNAF for scalar multiplication over Koblitz curve
author_facet	Yunos, Faridah Rosli, Rosimah Muslim, Norliana
author_sort	Yunos, Faridah
title	On some patterns of TNAF for scalar multiplication over Koblitz curve
title_short	On some patterns of TNAF for scalar multiplication over Koblitz curve
title_full	On some patterns of TNAF for scalar multiplication over Koblitz curve
title_fullStr	On some patterns of TNAF for scalar multiplication over Koblitz curve
title_full_unstemmed	On some patterns of TNAF for scalar multiplication over Koblitz curve
title_sort	on some patterns of tnaf for scalar multiplication over koblitz curve
publisher	Faculty of Science, University of Malaya
publishDate	2022
url	http://psasir.upm.edu.my/id/eprint/102385/ https://mjs.um.edu.my/index.php/MJS/article/view/34829
_version_	1772813437206790144

On some patterns of TNAF for scalar multiplication over Koblitz curve

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