Citation
Abstract
An algorithm was developed by previous researcher for elliptic scalar multiplication (SM) on Koblitz curve where the multiplier of SM is in the form of Pseudo -adic Non-Adjacent (pseudoTNAF). PseudoTNAF of an element of the ring Z ) where is an expansion where the digits are generated by successively dividing by , allowing remainders of , 0 or 1. Such a multiplier is in the form of . In this paper, we refine some properties of the multiplier from previous researchers focusing on even and odd situation for and . We also propose two properties of when is even and is odd. As a result, the nature of and are depends on the nature of and when is even. Whereas, the nature of and are not depends on the nature of and when is odd.
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Official URL or Download Paper: https://mjs.um.edu.my/article/view/15508
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Additional Metadata
| Item Type: | Article |
|---|---|
| Divisions: | Faculty of Science Institute for Mathematical Research |
| Publisher: | Faculty of Science, University of Malaya |
| Keywords: | Pseudo -adic Non-Adjacent Form (pseudoTNAF); Scalar multiplication (SM); Koblitz curve |
| Depositing User: | Nurul Ainie Mokhtar |
| Date Deposited: | 20 Nov 2020 15:25 |
| Last Modified: | 20 Nov 2020 15:25 |
| URI: | http://psasir.upm.edu.my/id/eprint/72650 |
| Statistic Details: | View Download Statistic |
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