Citation
Abstract
Suppose E an elliptical curve defined over F2m and Ττ is Frobenius endomorphism from set with E(F2m) to itself. Koblitz curve is a special type of curves with Ττ already being used to improve the performance of scalar multiplication nP’s computation. P is a point that goes through the curve. Whereas its multiplier is a non-adjacent Ττ-adic (TNAF) form whose digits are generated by repeating division of an integer in Z(Ττ) by Ττ. Previous research has found that Ττm = Ττm + smΤτ with integers Ττm and sm play an important role in identifying the patterns of TNAF’s expansion. In this paper, we give a formula for coefficients aim in sm for i ≤ 6. We apply triangle’s number, pyramid’s number, Theorem Nicomachus and Faulhaber’s formula in addition to mathematical induction to prove this formula. With this approach, the new expression for rm for some m can be produced to identify odd and even situations in the pseudoTNAF’s system
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Additional Metadata
| Item Type: | Article |
|---|---|
| Divisions: | Faculty of Science Institute for Mathematical Research |
| Publisher: | Malaysian Mathematical Society |
| Keywords: | Frobenius Endomorphism; Koblitz curve; Elliptic curve cryptography; Scalar multiplication; Endomorphism; Cryptography; Number theory; Modular arithmetic; Ττ-adic non adjacent form (TNAF); Pseudo Ττ-adic non adjacent form (pseudoTNAF) |
| Depositing User: | Mr. Mohamad Syahrul Nizam Md Ishak |
| Date Deposited: | 21 Mar 2024 08:43 |
| Last Modified: | 21 Mar 2024 08:43 |
| URI: | http://psasir.upm.edu.my/id/eprint/102537 |
| Statistic Details: | View Download Statistic |
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