Based on the elliptic curve cryptosystem, a multikey sharing scheme is used.
基于椭圆曲线密码系统,采用了多键共享方案。
All of their security is based on elliptic curve discrete logarithm problem.
它们的安全性都是基于椭圆曲线离散对数问题。
The system is based on expression question of elliptic curve dispersed number.
此系统是基于椭圆曲线离散对数表示问题的。
To offer a high efficiency digital signature based on elliptic curve cryptography.
为给出一种基于椭圆曲线密码的高效率的数字签名方案。
Design a user identity authentication scheme based on the elliptic curve cryptosystem.
设计了一种基于该椭圆曲线密码体制的用户身份认证方案。
Elliptic curve cryptosystem is a kind of public-key cryptosystem based on algebra curve.
椭圆曲线密码体制是一种基于代数曲线的公开钥密码体制。
This paper mainly researches algorithms and applications of elliptic curve cryptography.
本文主要研究椭圆曲线密码算法及应用。
Elliptic curve cryptosystems are one kind of the most promising public key cryptosystems.
椭圆曲线密码是目前最具潜力的一类公钥密码系统。
The Elliptic Curve Cryptosystem (ECC) provides the highest strength-per-bit for security.
椭圆曲线公钥密码体制(ECC)具有最高的位安全强度。
And it works together with a new hardware chip to get a elliptic curve public-key cryptosystem.
并且与设计的点乘硬件芯片一起构成了一种椭圆曲线公钥制密码系统。
This article deals with the design and implementation of a cryptosystem based on elliptic curve.
本文主要完成了一个基于椭圆曲线的加密系统的设计和实现。
Elliptic curve cryptosystem (ECC) is a kind of public-key cryptosystem based on algebraic curve.
椭圆曲线密码体制(ECC)是一种基于代数曲线的公钥密码体制。
In this dissertation the elliptic curve cryptosystems and the related algorithms are investigated.
本文主要研究椭圆曲线密码和其中的有关算法。
Both of their security are based on the intractability of elliptic curve discrete logarithm problem.
两种方案的安全性都是基于椭圆曲线离散对数问题的难解性。
Research conclusions indicate blind signature algorithm based on elliptic curve is safe and effective.
研究结果表明基于椭圆曲线的盲签署算法是安全的,高效的。
In the implementation of the elliptic curve cryptosystem, we first have to select a secure elliptic curve.
在椭圆曲线密码体制的实现中,选取安全的椭圆曲线是首要问题。
Based on identity and bilinear pairing on the Elliptic Curve, a new multi-signcryption scheme is proposed.
基于身份和椭圆曲线上双线性对,提出了一种新的多重签密方案。
Point out that the secure elliptic curve is the master key of constructing the elliptic curve cryptosystem.
安全的椭圆曲线构造和基点的选取,是椭圆曲线密码体制实现的的关键。
Then, a group key mechanism based on elliptic curve cryptosystem(ECC) is proposed, and which secrecy is proved.
其次,提出一种椭圆曲线的组密钥机制,证明了组密钥机制的安全性。
Several convertible signcryption schemes with semantic security based on elliptic curve cryptosystem were proposed.
基于椭圆曲线密码体制建立了几个具有语义安全的可转换签密方案。
A directed digital signature based on hyper elliptic curve cryptosystems was proposed and the security was discussed.
该文基于超椭圆曲线密码体制提出了一个单向签名方案,并分析了其安全性。
The fast implementation of elliptic curve cryptosystems relies on the efficient computation of scalar multiplication.
椭圆曲线密码体制的实现速度依赖于曲线上标量乘法的运算速度。
In the paper, based on the FPGA chip, the realization and optimized design of the elliptic curve cryptography are studied.
本文主要对基于FPGA芯片的椭圆曲线密码算法的实现及优化设计进行了研究。
The finite field arithmetic, elliptic curve cryptography (ECC) and the finite field multiplier are investigated in this thesis.
本论文研究的主要内容是有限域算术、椭圆曲线加密算法和有限域乘法器。
Elliptic Curve Cryptography (ECC) has the highest safety strength of private key per bit in the Public-Key Cryptography recently.
椭圆曲线密码体制是目前公钥体制中每比特密钥安全强度最高的一种密码体制。
To resist the side channel attacks of elliptic curve cryptography, a new fast and secure point multiplication algorithm is proposed.
为了抵抗椭圆曲线密码的边信道攻击,提出了一种新型快速安全的标量乘算法。
This paper, firstly introduces the elliptic curve in finite field and algebraic law of its point group, gives the order of the group.
该文首先介绍有限域上定义的椭圆曲线及点群运算规则,给出椭圆曲线点群的阶。
This paper, firstly introduces the elliptic curve in finite field and algebraic law of its point group, gives the order of the group.
该文首先介绍有限域上定义的椭圆曲线及点群运算规则,给出椭圆曲线点群的阶。
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