New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography
In Elliptic Curve Cryptography (ECC), computational levels of scalar multiplication contains three levels: scalar arithmetic, point arithmetic and field arithmetic. To achieve an efficient ECC performance, precomputed points help to realize a faster computation, which takes away the need to repeat t...
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Science and Information Organization
2019
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| Online Access: | http://psasir.upm.edu.my/id/eprint/81471/1/New%20quintupling%20point%20arithmetic%205P%20formulas%20for%20L%C5%8Fpez-Dahab%20coordinate%20over%20binary%20elliptic%20curve%20cryptography.pdf http://psasir.upm.edu.my/id/eprint/81471/ https://thesai.org/Publications/ViewPaper?Volume=10&Issue=7&Code=IJACSA&SerialNo=54 |
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my.upm.eprints.814712021-01-30T20:17:10Z http://psasir.upm.edu.my/id/eprint/81471/ New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography Abdul Raheem, Waleed Khalid Amin Md Yasin, Sharifah Udzir, Nur Izura Kamel Ariffin, Muhammad Rezal In Elliptic Curve Cryptography (ECC), computational levels of scalar multiplication contains three levels: scalar arithmetic, point arithmetic and field arithmetic. To achieve an efficient ECC performance, precomputed points help to realize a faster computation, which takes away the need to repeat the addition process every time. This paper introduces new quintupling point (5P) formulas which can be precomputed once and can be reused at the scalar multiplication level. We considered mixed addition in Affine and Lŏpez-Dahab since the mixed addition computation cost is better than the traditional addition in Lŏpez-Dahab coordinates over binary curve. Two formulas are introduced for the point quintupling which (Double Double Add) and (Triple Add Double), the cost of the two formulas are 17 multiplication+12 squaringand 23 multiplication+13 squaring respectively. The two formulas are proven as valid points. The new quintupling point can be implemented with different scalar multiplication methods. Science and Information Organization 2019 Article PeerReviewed text en http://psasir.upm.edu.my/id/eprint/81471/1/New%20quintupling%20point%20arithmetic%205P%20formulas%20for%20L%C5%8Fpez-Dahab%20coordinate%20over%20binary%20elliptic%20curve%20cryptography.pdf Abdul Raheem, Waleed Khalid Amin and Md Yasin, Sharifah and Udzir, Nur Izura and Kamel Ariffin, Muhammad Rezal (2019) New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography. International Journal of Advanced Computer Science and Applications, 10 (7). pp. 397-401. ISSN 2156-5570; ESSN: 2158-107X https://thesai.org/Publications/ViewPaper?Volume=10&Issue=7&Code=IJACSA&SerialNo=54 10.14569/IJACSA.2019.0100754 |
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In Elliptic Curve Cryptography (ECC), computational levels of scalar multiplication contains three levels: scalar arithmetic, point arithmetic and field arithmetic. To achieve an efficient ECC performance, precomputed points help to realize a faster computation, which takes away the need to repeat the addition process every time. This paper introduces new quintupling point (5P) formulas which can be precomputed once and can be reused at the scalar multiplication level. We considered mixed addition in Affine and Lŏpez-Dahab since the mixed addition computation cost is better than the traditional addition in Lŏpez-Dahab coordinates over binary curve. Two formulas are introduced for the point quintupling which (Double Double Add) and (Triple Add Double), the cost of the two formulas are 17 multiplication+12 squaringand 23 multiplication+13 squaring respectively. The two formulas are proven as valid points. The new quintupling point can be implemented with different scalar multiplication methods. |
| format |
Article |
| author |
Abdul Raheem, Waleed Khalid Amin Md Yasin, Sharifah Udzir, Nur Izura Kamel Ariffin, Muhammad Rezal |
| spellingShingle |
Abdul Raheem, Waleed Khalid Amin Md Yasin, Sharifah Udzir, Nur Izura Kamel Ariffin, Muhammad Rezal New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography |
| author_facet |
Abdul Raheem, Waleed Khalid Amin Md Yasin, Sharifah Udzir, Nur Izura Kamel Ariffin, Muhammad Rezal |
| author_sort |
Abdul Raheem, Waleed Khalid Amin |
| title |
New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography |
| title_short |
New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography |
| title_full |
New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography |
| title_fullStr |
New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography |
| title_full_unstemmed |
New quintupling point arithmetic 5P formulas for Lŏpez-Dahab coordinate over binary elliptic curve cryptography |
| title_sort |
new quintupling point arithmetic 5p formulas for lŏpez-dahab coordinate over binary elliptic curve cryptography |
| publisher |
Science and Information Organization |
| publishDate |
2019 |
| url |
http://psasir.upm.edu.my/id/eprint/81471/1/New%20quintupling%20point%20arithmetic%205P%20formulas%20for%20L%C5%8Fpez-Dahab%20coordinate%20over%20binary%20elliptic%20curve%20cryptography.pdf http://psasir.upm.edu.my/id/eprint/81471/ https://thesai.org/Publications/ViewPaper?Volume=10&Issue=7&Code=IJACSA&SerialNo=54 |
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