• KSII Transactions on Internet and Information Systems (TIIS)
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• v.11 no.11
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• pp.5625-5641
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• 2017

Certificateless public key cryptography resolves the certificate management problem in traditional public key cryptography and the key escrow problem in identity-based cryptography. In recent years, some good results have been achieved in speeding up the computation of bilinear pairing. However, the computation cost of the pairing is much higher than that of the scalar multiplication over the elliptic curve group. Therefore, it is still significant to design cryptosystem without pairing operations. A multi-signer universal designated multi-verifier signature scheme allows a set of signers to cooperatively generate a public verifiable signature, the signature holder then can propose a new signature such that only the designated set of verifiers can verify it. Multi-signer universal designated multi-verifier signatures are suitable in many different practical applications such as electronic tenders, electronic voting and electronic auctions. In this paper, we propose a certificateless multi-signer universal designated multi-verifier signature scheme and prove the security in the random oracle model. Our scheme does not use pairing operation. To the best of our knowledge, our scheme is the first certificateless multi-signer universal designated multi-verifier signature scheme.

• Journal of IKEEE
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• v.23 no.1
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• pp.58-67
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• 2019

A design of an elliptic curve cryptography (ECC) processor that supports both pseudo-random curves and Koblitz curves over $GF(2^m)$ defined by the NIST standard is described in this paper. A finite field arithmetic circuit based on a word-based Montgomery multiplier was designed to support five key lengths using a datapath of fixed size, as well as to achieve a lightweight hardware implementation. In addition, Lopez-Dahab's coordinate system was adopted to remove the finite field division operation. The ECC processor was implemented in the FPGA verification platform and the hardware operation was verified by Elliptic Curve Diffie-Hellman (ECDH) key exchange protocol operation. The ECC processor that was synthesized with a 180-nm CMOS cell library occupied 10,674 gate equivalents (GEs) and a dual-port RAM of 9 kbits, and the maximum clock frequency was estimated at 154 MHz. The scalar multiplication operation over the 223-bit pseudo-random elliptic curve takes 1,112,221 clock cycles and has a throughput of 32.3 kbps.

• Proceedings of the IEEK Conference
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• 2001.06b
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• pp.341-344
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• 2001

본 논문에서는 타원곡선 알고리즘에 기반한 공개키암호시스템 구현을 다룬다. 공개키의 길이는 193비트를 갖고 기약다항식은 p(x)=x/sup 193＋x/sup 15＋1을 사용하였다. 타원곡선은 polynomial basis 로 표현하였으며 SEC 2 파라메터를 기준으로 하였다 암호시스템은 polynomial basis 유한체 연산기로 구성되며 특히, digit-serial 구조로 스마트카드와 같이 제한된 면적에서 구현이 가능하도록 하였다. 시스템의 회로는 VHDL, SYNOPSYS 시뮬레이션 및 회로합성을 이용하여 XILINX FPGA로 회로를 구현하였다. 본 시스템 은 Diffie-Hellman 키교환에 적용하여 동작을 검증하였다.

• Proceedings of the Korea Institutes of Information Security and Cryptology Conference
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• 2001.11a
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• pp.407-410
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• 2001

본 논문에서는 자바 카드용 ECC (Elliptic Curve Cryptosystems) 및 ECDSA (Elliptic Curve Digital Signature Algorithm) 알고리즘 구현 및 시험 결과에 대해 언급하고자 한다. 163비트 타원곡선 암호시스템(ECC)은 현재 많이 사용되고 있는 RSA 1024 비트 이상의 안전성을 보장한다. 또한, 짧은 키 길이를 사용하기 때문에 메모리와 처리능력이 제한된 스마트 카드나 이동 통신 등과 같은 분야에서 매우 유용하게 사용될 수 있으며, ECC나 ECDSA를 자바 카드 상에 구현하여 사용함으로써 사용자들은 보다 강화된 보안성과 안전성을 제공받을 수 있을 것이다.

• Journal for History of Mathematics
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• v.28 no.2
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• pp.85-102
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• 2015

Elliptic curves are a common theme among various fields of mathematics, such as number theory, algebraic geometry, complex analysis, cryptography, and mathematical physics. In the history of elliptic curves, we can find number theoretic problems on the one hand, and complex function theoretic ones on the other. The elliptic curve theory is a synthesis of those two indeed. As an overview of the history of elliptic curves, we survey the Diophantine equations of 3rd degree and the congruent number problem as some of number theoretic trails of elliptic curves. We discuss elliptic integrals and elliptic functions, from which we get a glimpse of idea where the name 'elliptic curve' came from. We explain how the solution of Diophantine equations of 3rd degree and elliptic functions are related. Finally we outline the BSD conjecture, one of the 7 millennium problems proposed by the Clay Math Institute, as an important problem concerning elliptic curves.

• Proceedings of the Korea Information Processing Society Conference
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• 2005.11a
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• pp.873-876
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• 2005

무선 센서 네트워크 (Wireless Sensor Network)에서 기존에 존재하는 대부분의 보안 프로토콜들은 대칭적인 공유키(symmetric pairwise key) 설정에 기반하고 있다. 그러나 이러한 프로토콜들은 노드 전복 (node compromising), 그리고 과중한 트래픽의 문제점을 안고 있다. 더욱이, 대칭키 방법을 이용한 브로드캐스트 메시지 인증은 자원이 제약된 센서네트워크에서 적용하기에는 너무 복잡하다. 본 논문은 공개키를 이용한 공유키(Pairwise Key) 설정에 기반한 보안 프로토콜들을 제안한다. 특히 경량성을 위하여 타원 곡선 암호 (Ellptic Curve Cryptography)를 채택하였다. 제안 프로토콜은 공유키 설정과 브로드캐스트 메시지 인증을 위하여 각각 Elliptic Curve Diffie-Hellman (ECDH)과 Elliptic Curve Digital Signature Algorithm (ECDSA)를 이용한다. 더욱이, 분산된 rekeying 메커니즘 (decentralized rekeying mechanism)을 도입함으로써 TinySec 의 성능을 향상시킨다.

• ETRI Journal
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• v.25 no.5
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• pp.315-320
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• 2003

Elliptic curve cryptography (ECC) offers the highest security per bit among the known public key cryptosystems. The operation of ECC is based on the arithmetic of the finite field. This paper presents the design of a 193-bit finite field multiplier and an inversion unit based on a normal basis representation in which the inversion and the square operation units are easy to implement. This scalable multiplier can be constructed in a variable structure depending on the performance area trade-off. We implement it using Verilog HDL and a 0.35 ${\mu}m$ CMOS cell library and verify the operation by simulation.

• Proceedings of the Korean Institute of Information and Commucation Sciences Conference
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• 2016.10a
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• pp.158-160
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• 2016

전자서명(ECDSA), 키 교환(ECDH) 등에 사용되는 233-비트 타원곡선 암호(Elliptic Curve Cryptography; ECC) 프로세서의 설계에 대해 기술한다. $GF(2^{333})$ 상의 덧셈, 곱셈, 나눗셈 등의 유한체 연산을 지원하며, 하드웨어 자원 소모가 적은 쉬프트 연산과 XOR 연산만을 이용하여 구현하였다. 스칼라 곱셈은 modified montgomery ladder 알고리듬을 이용하여 구현하였으며, 정수 k의 정보를 노출하지 않고, 단순 전력분석에 보다 안전하다. 스칼라 곱셈 연산은 최대 490,699 클록 사이클이 소요된다. 설계된 ECC 프로세서는 Xilinx ISim을 이용한 시뮬레이션 결과값과 한국인터넷진흥원(KISA)의 참조 구현 값을 비교하여 정상 동작함을 확인하였다. Xilinx Virtex5 XC5VSX95T FPGA 디바이스 합성결과 1,576 슬라이스로 구현되었으며, 189 MHz의 최대 동작주파수를 갖는다.

• Journal of the Institute of Electronics Engineers of Korea SD
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• v.42 no.1
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• pp.57-67
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• 2005

Fast scalar multiplication of points on elliptic curve is important for elliptic curve cryptography applications. In order to vary field sizes depending on security situations, the cryptography coprocessors should support variable length finite field arithmetic units. To determine the effective variable length finite field arithmetic architecture, two well-known curve scalar multiplication algorithms were implemented on FPGA. The affine coordinates algorithm must use a hardware division unit, but the projective coordinates algorithm only uses a fast multiplication unit. The former algorithm needs the division hardware. The latter only requires a multiplication hardware, but it need more space to store intermediate results. To make the division unit versatile, we need to add a feedback signal line at every bit position. We proposed a method to mitigate this problem. For multiplication in projective coordinates implementation, we use a widely used digit serial multiplication hardware, which is simpler to be made versatile. We experimented with our implemented ECC coprocessors using variable length finite field arithmetic unit which has the maximum field size 256. On the clock speed 40 MHz, the scalar multiplication time is 6.0 msec for affine implementation while it is 1.15 msec for projective implementation. As a result of the study, we found that the projective coordinates algorithm which does not use the division hardware was faster than the affine coordinate algorithm. In addition, the memory implementation effectiveness relative to logic implementation will have a large influence on the implementation space requirements of the two algorithms.

• KIPS Transactions on Computer and Communication Systems
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• v.9 no.8
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• pp.165-170
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• 2020

As the IoT (Internet of Things) era is activated, a lot of information including personal information is being transmitted through IoT devices. For information protection, it is important to perform cryptography communication, and it is required to use a lightweight security protocol due to performance limitations. Currently, most of the encryption methods used in the security protocol use RSA and ECC (Elliptic Curve Cryptography). However, if a high performance quantum computer is developed and the Shor algorithm is used, it can no longer be used because it can easily solve the stability problems based on the previous RSA and ECC. Therefore, in this paper, we designed a security protocol that is resistant to the computational power of quantum computers. The code-based crypto ROLLO, which is undergoing the NIST (National Institute of Standards and Technology) post quantum cryptography standardization, was used, and a hash and XOR computation with low computational consumption were used for mutual communication between IoT devices. Finally, a comparative analysis and safety analysis of the proposed protocol and the existing protocol were performed.