• Title/Summary/Keyword: Modular multiplication

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Efficient Modular Multiplication for 224-bit Prime Field (224비트 소수체에서 효율적인 모듈러 곱셈)

  • Chang, Nam Su
    • Journal of the Korea Institute of Information Security & Cryptology
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    • v.29 no.3
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    • pp.515-518
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    • 2019
  • The performance of Elliptic Curves Cryptosystem(ECC) is dominated by the modular multiplication since the elliptic curve scalar multiplication consists of the modular multiplication in projective coordinates. In this paper, we propose a new method that combines the Karatsuba-Ofman multiplication method and a new modular reduction algorithm in order to improve the performance of the modular multiplication for NIST p224 in the FIPS 186-4 standard. The proposed method leads to a running time improvement for computing the modular multiplication about 25% faster than the previous methods. The results also show that the method can reduce the arithmetic complexity by half when compared with traditional implementations on the standpoint of the modular reduction.

The Novel Efficient Dual-field FIPS Modular Multiplication

  • Zhang, Tingting;Zhu, Junru;Liu, Yang;Chen, Fulong
    • KSII Transactions on Internet and Information Systems (TIIS)
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    • v.14 no.2
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    • pp.738-756
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    • 2020
  • The modular multiplication is the key module of public-key cryptosystems such as RSA (Rivest-Shamir-Adleman) and ECC (Elliptic Curve Cryptography). However, the efficiency of the modular multiplication, especially the modular square, is very low. In order to reduce their operation cycles and power consumption, and improve the efficiency of the public-key cryptosystems, a dual-field efficient FIPS (Finely Integrated Product Scanning) modular multiplication algorithm is proposed. The algorithm makes a full use of the correlation of the data in the case of equal operands so as to avoid some redundant operations. The experimental results show that the operation speed of the modular square is increased by 23.8% compared to the traditional algorithm after the multiplication and addition operations are reduced about (s2 - s) / 2, and the read operations are reduced about s2 - s, where s = n / 32 for n-bit operands. In addition, since the algorithm supports the length scalable and dual-field modular multiplication, distinct applications focused on performance or cost could be satisfied by adjusting the relevant parameters.

A Design of 256-bit Modular Multiplier using 3-way Toom-Cook Multiplication Algorithm and Fast Reduction Algorithm (3-way Toom-Cook 곱셈 알고리듬과 고속 축약 알고리듬을 이용한 256-비트 모듈러 곱셈기 설계)

  • Yang, Hyeon-Jun;Shin, Kyung-Wook
    • Proceedings of the Korean Institute of Information and Commucation Sciences Conference
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    • 2021.10a
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    • pp.223-225
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    • 2021
  • Modular multiplication is a key operation for point scalar multiplication of ECC, and is the most important factor affecting the performance of ECC processor. This paper describes a design of a 256-bit modular multiplier that adopts 3-way Toom-Cook multiplication algorithm and modified fast reduction algorithm. One 90-bit multiplier and three 264-bit adders were used to optimize the hardware size and the number of clock cycles required. The modular multiplier was verified by implementing it using Zynq UltraScale+ MPSoC device and the modular multiplication operation takes 15 clock cycles.

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Hardware Design of Efficient Montgomery Multiplier for Low Area RSA (저면적 RSA를 위한 효율적인 Montgomery 곱셈기 하드웨어 설계)

  • Nti, Richard B.;Ryoo, Kwangki
    • Proceedings of the Korean Institute of Information and Commucation Sciences Conference
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    • 2017.10a
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    • pp.575-577
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    • 2017
  • In public key cryptography such as RSA, modular exponentiation is the most time-consuming operation. RSA's modular exponentiation can be computed by repeated modular multiplication. To attain high efficiency for RSA, fast modular multiplication algorithms have been proposed to speed up decryption/encryption. Montgomery multiplication is limited by the carry propagation delay from the addition of long operands. In this paper, we propose a hardware structure that reduces the area of the Montgomery multiplication implementation for lightweight applications of RSA. Experimental results showed that the new design can achieve higher performance and reduce hardware area. A frequency of 884.9MHz and 250MHz were achieved with 84K and 56K gates respectively using the 90nm technology.

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Bit-sliced Modular Multiplication Algorithm and Implementation (비트 확장성을 갖는 모듈러 곱셈 알고리즘 및 모듈러 곱셈기 설계)

  • 류동렬
    • Journal of the Korea Institute of Information Security & Cryptology
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    • v.10 no.3
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    • pp.3-10
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    • 2000
  • In this paper we propose a bit-sliced modular multiplication algorithm and a bit-sliced modular multiplier design meeting the increasing crypto-key size for RSA public key cryptosystem. The proposed bit-sliced modular multiplication algorithm was designed by modifying the Montgomery's algorithm. The bit-sliced modular multiplier is easy to expand to process large size operands and can be immediately applied to RSA public key cryptosystem.

Efficient Architecture of an n-bit Radix-4 Modular Multiplier in Systolic Array Structure (시스톨릭 어레이 구조를 갖는 효율적인 n-비트 Radix-4 모듈러 곱셈기 구조)

  • Park, Tae-geun;Cho, Kwang-won
    • The KIPS Transactions:PartA
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    • v.10A no.4
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    • pp.279-284
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    • 2003
  • In this paper, we propose an efficient architecture for radix-4 modular multiplication in systolic array structure based on the Montgomery's algorithm. We propose a radix-4 modular multiplication algorithm to reduce the number of iterations, so that it takes (3/2)n+2 clock cycles to complete an n-bit modular multiplication. Since we can interleave two consecutive modular multiplications for 100% hardware utilization and can start the next multiplication at the earliest possible moment, it takes about only n/2 clock cycles to complete one modular multiplication in the average. The proposed architecture is quite regular and scalable due to the systolic array structure so that it fits in a VLSI implementation. Compared to conventional approaches, the proposed architecture shows shorter period to complete a modular multiplication while requiring relatively less hardware resources.

A 521-bit high-performance modular multiplier using 3-way Toom-Cook multiplication and fast reduction algorithm (3-way Toom-Cook 곱셈과 고속 축약 알고리듬을 이용한 521-비트 고성능 모듈러 곱셈기)

  • Yang, Hyeon-Jun;Shin, Kyung-Wook
    • Journal of the Korea Institute of Information and Communication Engineering
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    • v.25 no.12
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    • pp.1882-1889
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    • 2021
  • This paper describes a high-performance hardware implementation of modular multiplication used as a core operation in elliptic curve cryptography. A 521-bit high-performance modular multiplier for NIST P-521 curve was designed by adopting 3-way Toom-Cook integer multiplication and fast reduction algorithm. Considering the property of the 3-way Toom-Cook algorithm in which the result of integer multiplication is multiplied by 1/3, modular multiplication was implemented on the Toom-Cook domain where the operands were multiplied by 3. The modular multiplier was implemented in the xczu7ev FPGA device to verify its hardware operation, and hardware resources of 69,958 LUTs, 4,991 flip-flops, and 101 DSP blocks were used. The maximum operating frequency on the Zynq7 FPGA device was 50 MHz, and it was estimated that about 4.16 million modular multiplications per second could be achieved.

A Study on FPGA Implementation of Radix-16 Montgomery Modular Multiplication and Comparison of Power Dissipation (Radix-16 Montgomery Modular 곱셈 알고리즘의 FPGA 구현과 전력 소모 비교에 관한 연구)

  • Kim, Pan-Ki;Kim, Ki-Young;Kim, Seok-Yoon
    • Proceedings of the IEEK Conference
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    • 2005.11a
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    • pp.813-816
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    • 2005
  • In last several years, the need for the right of privacy and mobile banking has increased. The RSA system is one of the most widely used public key cryptography systems, and its core arithmetic operation IS modular multiplication. P. L. Montgomery proposed a very efficient modular multiplication technique that is well suited to hardware implementation. In this paper, the montgomery modular multiplication algorithms(CIOS, SOS, FIOS) , developed by Cetin Kaya Koc, is presented and implemented using radix-16 and Altera FPGA. Also, we undertake comparisons of power dissipation using Quatrus II PowerPlay Power Analyzer.

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Implementation of Modular Multiplication and Communication Adaptor for Public Key Crytosystem (공개키 암호체계를 위한 Modular 곱셈개선과 통신회로 구현에 관한 연구)

  • 한선경;이선복;유영갑
    • The Journal of Korean Institute of Communications and Information Sciences
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    • v.16 no.7
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    • pp.651-662
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    • 1991
  • An improved modular multiplication algorithm for RSA type public key cryptosystem and its application to a serial communication cricuit are presented. Correction on a published fast modular multiplication algorithm is proposed and verified thru simulation. Cryptosystem for RS 232C communication protocol isdesigned and prototyped for low speed data exchange between computers. The system adops the correct algoroithm and operates successfully using a small size key.

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Montgomery Multiplier Supporting Dual-Field Modular Multiplication (듀얼 필드 모듈러 곱셈을 지원하는 몽고메리 곱셈기)

  • Kim, Dong-Seong;Shin, Kyung-Wook
    • Journal of the Korea Institute of Information and Communication Engineering
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    • v.24 no.6
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    • pp.736-743
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    • 2020
  • Modular multiplication is one of the most important arithmetic operations in public-key cryptography such as elliptic curve cryptography (ECC) and RSA, and the performance of modular multiplier is a key factor influencing the performance of public-key cryptographic hardware. An efficient hardware implementation of word-based Montgomery modular multiplication algorithm is described in this paper. Our modular multiplier was designed to support eleven field sizes for prime field GF(p) and binary field GF(2k) as defined by SEC2 standard for ECC, making it suitable for lightweight hardware implementations of ECC processors. The proposed architecture employs pipeline scheme between the partial product generation and addition operation and the modular reduction operation to reduce the clock cycles required to compute modular multiplication by 50%. The hardware operation of our modular multiplier was demonstrated by FPGA verification. When synthesized with a 65-nm CMOS cell library, it was realized with 33,635 gate equivalents, and the maximum operating clock frequency was estimated at 147 MHz.