• Title/Summary/Keyword: Frobenius map

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SCALAR MULTIPLICATION ON GENERALIZED HUFF CURVES USING THE SKEW-FROBENIUS MAP

  • Gyoyong Sohn
    • East Asian mathematical journal
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    • v.40 no.5
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    • pp.551-557
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    • 2024
  • This paper presents the Frobenius endomorphism on generalized Huff curve and provides the characteristic polynomial of the map. By applying the Frobenius endomorphism on generalized Huff curve, we construct a skew-Frobenius map defined on the quadratic twist of a generalized Huff curve. This map offers an efficiently computable homomorphism for performing scalar multiplication on the generalized Huff curve over a finite field. As an application, we describe the GLV method combined with the Frobenius endomorphism over the curve to speed up the scalar multiplication.

FROBENIUS MAP ON THE EXTENSIONS OF T-MODULES

  • Woo, Sung-Sik
    • Communications of the Korean Mathematical Society
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    • v.13 no.4
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    • pp.743-749
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    • 1998
  • On the group of all extensions of elliptic modules by the Carlitz module we define Frobenius map and by using a concrete description of the extension group we give an explicit description of the Frobenius map.

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A NOTE ON TIGHT CLOSURE AND FROBENIUS MAP

  • Moon, Myung-In
    • Journal of the Korean Mathematical Society
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    • v.34 no.1
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    • pp.13-21
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    • 1997
  • In recent years M. Hochster and C. Huneke introduced the notions of tight closure of an ideal and of the weak F-regularity of a ring of positive prime characteristic. Here 'F' stands for Frobenius. This notion enabled us to play an important role in a commutative ring theory, and other related topics.

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Scalar Multiplication on Elliptic Curves by Frobenius Expansions

  • Cheon, Jung-Hee;Park, Sang-Joon;Park, Choon-Sik;Hahn, Sang-Geun
    • ETRI Journal
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    • v.21 no.1
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    • pp.28-39
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    • 1999
  • Koblitz has suggested to use "anomalous" elliptic curves defined over ${\mathbb{F}}_2$, which are non-supersingular and allow or efficient multiplication of a point by and integer, For these curves, Meier and Staffelbach gave a method to find a polynomial of the Frobenius map corresponding to a given multiplier. Muller generalized their method to arbitrary non-supersingular elliptic curves defined over a small field of characteristic 2. in this paper, we propose an algorithm to speed up scalar multiplication on an elliptic curve defined over a small field. The proposed algorithm uses the same field. The proposed algorithm uses the same technique as Muller's to get an expansion by the Frobenius map, but its expansion length is half of Muller's due to the reduction step (Algorithm 1). Also, it uses a more efficient algorithm (Algorithm 3) to perform multiplication using the Frobenius expansion. Consequently, the proposed algorithm is two times faster than Muller's. Moreover, it can be applied to an elliptic curve defined over a finite field with odd characteristic and does not require any precomputation or additional memory.

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Fast Scalar Multiplication Algorithm on Elliptic Curve over Optimal Extension Fields (최적확장체 위에서 정의되는 타원곡선에서의 고속 상수배 알고리즘)

  • Chung Byungchun;Lee Soojin;Hong Seong-Min;Yoon Hyunsoo
    • Journal of the Korea Institute of Information Security & Cryptology
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    • v.15 no.3
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    • pp.65-76
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    • 2005
  • Speeding up scalar multiplication of an elliptic curve point has been a prime approach to efficient implementation of elliptic curve schemes such as EC-DSA and EC-ElGamal. Koblitz introduced a $base-{\phi}$ expansion method using the Frobenius map. Kobayashi et al. extended the $base-{\phi}$ scalar multiplication method to suit Optimal Extension Fields(OEF) by introducing the table reference method. In this paper we propose an efficient scalar multiplication algorithm on elliptic curve over OEF. The proposed $base-{\phi}$ scalar multiplication method uses an optimized batch technique after rearranging the computation sequence of $base-{\phi}$ expansion usually called Horner's rule. The simulation results show that the new method accelerates the scalar multiplication about $20\%{\sim}40\%$ over the Kobayashi et al. method and is about three times as fast as some conventional scalar multiplication methods.

An Improved Scalar Multiplication on Elliptic Curves over Optimal Extension Fields (최적확장체에서 정의되는 타원곡선 상에서 효율적인 스칼라 곱셈 알고리즘)

  • 정병천;이재원;홍성민;김환준;김영수;황인호;윤현수
    • Proceedings of the Korean Information Science Society Conference
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    • 2000.10a
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    • pp.593-595
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    • 2000
  • 본 논문에서는 최적확장체(Optimal Extension Field; OEF)에서 정의되는 타원곡선 상에서 효율적인 스칼라 곱셈 알고리즘을 제안한다. 이 스칼라 곱셈 알고리즘은 프로비니어스 사상(Frobenius map)을 이용하여 스칼라 값을 Horner의 방법으로 Base-Ф 전개하고, 이 전개된 수식을 일괄처리 기법(batch-processing technique)을 사용하여 연산한다. 이 알고리즘을 적용할 경우, Kobayashi 등이 제안한 스칼라 곱셈 알고리즘보다 40% 정도의 성능향상을 보인다.

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A Scalar Multiplication Algorithm Secure against Side-Channel Attacks for Koblitz Curve Cryptosystems (암호공격에 안전한 Koblitz 타원곡선 암호시스템의 스칼라 곱셈 알고리즘)

  • Jang, Yong-Hee;Takagi, Naofumi;Takagi, Kazuyoshi;Kwon, Yong-Jin
    • Proceedings of the Korea Institutes of Information Security and Cryptology Conference
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    • 2006.06a
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    • pp.356-360
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    • 2006
  • Recently, many power analysis attacks have been proposed. Since the attacks are powerful, it is very important to implement cryptosystems securely against the attacks. We propose countermeasures against power analysis attacks for elliptic curve cryptosystems based on Koblitz curves (KCs), which are a special class of elliptic curves. That is, we make our countermeasures be secure against SPA, DPA, and new DPA attacks, specially RPA, ZPA, using a random point at each execution of elliptic curve scalar multiplication. And since our countermeasures are designed to use the Frobenius map of KC, those are very fast.

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CYCLIC CODES OVER THE RING 𝔽p[u, v, w]/〈u2, v2, w2, uv - vu, vw - wv, uw - wu〉

  • Kewat, Pramod Kumar;Kushwaha, Sarika
    • Bulletin of the Korean Mathematical Society
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    • v.55 no.1
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    • pp.115-137
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    • 2018
  • Let $R_{u{^2},v^2,w^2,p}$ be a finite non chain ring ${\mathbb{F}}_p[u,v,w]{\langle}u^2,\;v^2,\;w^2,\;uv-vu,\;vw-wv,\;uw-wu{\rangle}$, where p is a prime number. This ring is a part of family of Frobenius rings. In this paper, we explore the structures of cyclic codes over the ring $R_{u{^2},v^2,w^2,p}$ of arbitrary length. We obtain a unique set of generators for these codes and also characterize free cyclic codes. We show that Gray images of cyclic codes are 8-quasicyclic binary linear codes of length 8n over ${\mathbb{F}}_p$. We also determine the rank and the Hamming distance for these codes. At last, we have given some examples.

Improvement on Bailey-Paar's Optimal Extension Field Arithmetic (Bailey-Paar 최적확장체 연산의 개선)

  • Lee, Mun-Kyu
    • Journal of KIISE:Computer Systems and Theory
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    • v.35 no.7
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    • pp.327-331
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    • 2008
  • Optimal Extension Fields (OEFs) are finite fields of a special form which are very useful for software implementation of elliptic curve cryptosystems. Bailey and Paar introduced efficient OEF arithmetic algorithms including the $p^ith$ powering operation, and an efficient algorithm to construct OEFs for cryptographic use. In this paper, we give a counterexample where their $p^ith$ powering algorithm does not work, and show that their OEF construction algorithm is faulty, i.e., it may produce some non-OEFs as output. We present improved algorithms which correct these problems, and give improved statistics for the number of OEFs.