• Journal of Information Processing Systems
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• 제8권1호
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• pp.145-158
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• 2012

Hyperelliptic Curve Cryptosystem (HECC) is well suited for all kinds of embedded processor architectures, where resources such as storage, time, or power are constrained due to short operand sizes. We can construct genus 3 HECC on 54-bit finite fields in order to achieve the same security level as 160-bit ECC or 1024-bit RSA due to the algebraic structure of Hyperelliptic Curve. This paper explores various possible attacks to the discrete logarithm in the Jacobian of a Hyperelliptic Curve (HEC) and addition and doubling of the divisor using explicit formula to speed up the scalar multiplication. Our aim is to develop a cryptosystem that can sign and authenticate documents and encrypt / decrypt messages efficiently for constrained devices in wireless networks. The performance of our proposed cryptosystem is comparable with that of ECC and the security analysis shows that it can resist the major attacks in wireless networks.

• Journal of the Korean Society for Industrial and Applied Mathematics
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• 제4권1호
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• pp.23-28
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• 2000

We compute the order of jacobian groups of hyperelliptic curves on a finite field of characteristic 3 and we determine which curves are secure against known attacks.

• Journal of applied mathematics & informatics
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• 제32권1_2호
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• pp.17-26
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• 2014

In this paper, we present an algorithm for computing the number of points on the Jacobian varieties of genus 3 hyperelliptic curves of type $y^2=x^7+ax$ over finite prime fields. The problem of determining the group order of the Jacobian varieties of algebraic curves defined over finite fields is important not only arithmetic geometry but also curve-based cryptosystems in order to find a secure curve. Based on this, we provide the explicit formula of the characteristic polynomial of the Frobenius endomorphism of the Jacobian variety of hyperelliptic curve $y^2=x^7+ax$ over a finite field $\mathbb{F}_p$ with $p{\equiv}1$ modulo 12. Moreover, we also introduce some implementation results by using our algorithm.

• 한국정보전자통신기술학회논문지
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• 제4권4호
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• pp.318-326
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• 2011

유비쿼터스 환경에서 계산의 복잡성,메모리,전력소비등의 제약성으로 인하여 공개키 암호시스템을 적용하기는 매우 어렵다. 초타원 곡선 암호시스템은 RSA나 ECC보다 짧은 비트 길이를 가지고 동일한 안전성을 제공한다. 초타원 곡선 암호시스템에서 스칼라 곱셈은 핵심적인 연산이다. T.Lange는 다수의 좌표를 사용하여 초타원 곡선 암호시스템에서 역원 연산이 없는 스칼라 곱셈 알고리즘을 개발 하였다.그러나 다수의 좌표를 사용하는 것은 SCA에 노출되고 더 많은 메모리가 요구 된다. 본 논문에서는 초 타원곡선 암호시스템에서 동시원알고리즘을 가진 안전한 스칼라 곱셈 알고리즘을 개발하였다. 안전성 과 성능을 위하여 동시역원 알고리즘을 적용하였다 개발한 알고리즘은 SPA와 DPA 에 안전하다.