Journal of Engineering and Applied Sciences

98
Views

0
Downloads

On Some Specific Patterns of τ-Adic Non-Adjacent Form Expansion over Ring Z (τ)

F. Yunos, S.M. Suberi, Sh.K. Said Husain, M.R.K Ariffin and M.A. Asbullah
Page: 8609-8615 | Received 21 Sep 2022, Published online: 21 Sep 2022

By Research Area

Medicine & Public Health Life Sciences Engineering Mathematics Biomedicine Physics Chemistry Computer Science Earth Sciences Social Sciences Business and Management Psychology Materials Science Economics Education Environment Philosophy Statistics Law Political Science and International Relations Pharmacy Dentistry Energy Linguistics Geography Finance Criminology and Criminal Justice Medicine Cultural and Media Studies History Architecture / Design Literature Biomedical Sciences Religious Studies Education & Language Food Science & Nutrition Public Health

By Volume and Issue

Abstract

Let τ=(-1)^1-a+√-7/2 for a∈{0, 1} is Frobenius map from the set E_a(F₂m) to it self for a point (x, y) on Koblitz curves E_a. Let P and Q be two points on this curves. τ-adic Non-Adjacent Form (TNAF) of α an element of the ring Z(τ) = {α = c+dτ|c, d∈Z} is an expansion where the digits are generated by successively dividing α by τ, allowing remainders of -1, 0 or 1. The implementation of TNAF as the multiplier of scalar multiplication nP = Q is one of the technique in elliptical curve cryptography. In this study, we find the formulas for TNAF that have specific patterns [0, c₁, …, c_1-1], [-1, c₁, …, c_1-1], [1, c₁, …, c_1-1] and [0, 0, 0, c₃, c₄, …, c_1-1].

How to cite this article:

F. Yunos, S.M. Suberi, Sh.K. Said Husain, M.R.K Ariffin and M.A. Asbullah. On Some Specific Patterns of τ-Adic Non-Adjacent Form Expansion over Ring Z (τ).
DOI: https://doi.org/10.36478/jeasci.2019.8609.8615
URL: https://www.makhillpublications.co/view-article/1816-949x/jeasci.2019.8609.8615