讨论了基于节点的有限元方法的网格生成算法及其产生的不一致性问题,提出了基于D e launay三角剖分的唯一性来克服网格不一致性现象的思想,并建议使用局部区域分割方法合理地确定探索圆半径,使中心节点的探索圆包含它的所有卫星点,进而...讨论了基于节点的有限元方法的网格生成算法及其产生的不一致性问题,提出了基于D e launay三角剖分的唯一性来克服网格不一致性现象的思想,并建议使用局部区域分割方法合理地确定探索圆半径,使中心节点的探索圆包含它的所有卫星点,进而确保算法无不一致性。理论分析和算例表明了该方法的可靠性及有效性。展开更多
Elliptic curve cryptosystem is the focus of public key cryptology nowadays, for it has many advantages RSA lacks. This paper introduced a new heuristic algorithm on computing multiple scalar multiplications of a given...Elliptic curve cryptosystem is the focus of public key cryptology nowadays, for it has many advantages RSA lacks. This paper introduced a new heuristic algorithm on computing multiple scalar multiplications of a given point. Based on this algorithm, a new method of computing scalar multiplication of elliptic curve over optimal extension field (OEF) using Frobenius map was presented. The new method is more efficient than the traditional ones. In the last part of this paper, the comparison was given in the end.展开更多
文摘Elliptic curve cryptosystem is the focus of public key cryptology nowadays, for it has many advantages RSA lacks. This paper introduced a new heuristic algorithm on computing multiple scalar multiplications of a given point. Based on this algorithm, a new method of computing scalar multiplication of elliptic curve over optimal extension field (OEF) using Frobenius map was presented. The new method is more efficient than the traditional ones. In the last part of this paper, the comparison was given in the end.