Title :
Faster Scalar Multiplication for Elliptic Curve Cryptosystems
Author :
Sakemi, Yumi ; Izu, Tetsuya ; Shirase, Masaaki
Author_Institution :
FUJITSU Labs. Ltd., Kawasaki, Japan
Abstract :
In Elliptic Curve Cryptosystems (ECC), a scalar multiplication of a base point is the most time-consuming operation. Thus, a lot of improvemnets on the scalar multiplication algorithms have been proposed. In TwC 2013, Shirase introduced a new strategy for computing a scalar multiplication efficiently by transforming a base point to a new base point with its x-coordinate value 0 [Shi13]. In fact, Shirase showed that the strategy is efficient for ECADD in the projective coordinates. This paper applies Shirase´s strategy to ECDBL in the projective coordinates, and to ECADD and ECDBL in the Jacobian coordinates, and evaluates the efficiency of Shirase´s strategy for computing a scalar multiplication.
Keywords :
linear algebra; public key cryptography; ECADD; ECC; ECDBL; Jacobian coordinates; base point; elliptic curve additions; elliptic curve cryptosystems; elliptic curve doublings; faster scalar multiplication; projective coordinates; scalar multiplication algorithms; Electronic mail; Elliptic curve cryptography; Elliptic curves; Equations; Jacobian matrices; Resistance; Elliptic curve cryptosystems (EC bj; a scalar multiplication;
Conference_Titel :
Network-Based Information Systems (NBiS), 2013 16th International Conference on
Conference_Location :
Gwangju
Print_ISBN :
978-1-4799-2509-4
DOI :
10.1109/NBiS.2013.87
