• Title/Summary/Keyword: $Eta_T$ Pairing

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Power Analysis Attacks and Countermeasures on ${\eta}_T$ Pairing over Binary Fields

  • Kim, Tae-Hyun;Takagi, Tsuyoshi;Han, Dong-Guk;Kim, Ho-Won;Lim, Jong-In
    • ETRI Journal
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    • v.30 no.1
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    • pp.68-80
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    • 2008
  • Since many efficient algorithms for implementing pairings have been proposed such as ${\eta}_T$ pairing and the Ate pairing, pairings could be used in constraint devices such as smart cards. However, the secure implementation of pairings has not been thoroughly investigated. In this paper, we investigate the security of ${\eta}_T$ pairing over binary fields in the context of side-channel attacks. We propose efficient and secure ${\eta}_T$ pairing algorithms using randomized projective coordinate systems for computing the pairing.

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Efficient Hardware Implementation of ${\eta}_T$ Pairing Based Cryptography (${\eta}_T$ Pairing 알고리즘의 효율적인 하드웨어 구현)

  • Lee, Dong-Geoon;Lee, Chul-Hee;Choi, Doo-Ho;Kim, Chul-Su;Choi, Eun-Young;Kim, Ho-Won
    • Journal of the Korea Institute of Information Security & Cryptology
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    • v.20 no.1
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    • pp.3-16
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    • 2010
  • Recently in the field of the wireless sensor network, many researchers are attracted to pairing cryptography since it has ability to distribute keys without additive communication. In this paper, we propose efficient hardware implementation of ${\eta}_T$ pairing which is one of various pairing scheme. we suggest efficient hardware architecture of ${\eta}_T$ pairing based on parallel processing and register/resource optimization, and then we present the result of our FPGA implementation over GF($2^{239}$). Our implementation gives 15% better result than others in Area Time Product.

Construction of Efficient and Secure Pairing Algorithm and Its Application

  • Choi, Doo-Ho;Han, Dong-Guk;Kim, Ho-Won
    • Journal of Communications and Networks
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    • v.10 no.4
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    • pp.437-443
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    • 2008
  • The randomized projective coordinate (RPC) method applied to a pairing computation algorithm is a good solution that provides an efficient countermeasure against side channel attacks. In this study, we investigate measures for increasing the efficiency of the RPC-based countermeasures and construct a method that provides an efficient RPC-based countermeasure against side channel attacks. We then apply our method to the well-known $\eta_T$ pairing algorithm over binary fields and obtain an RPC-based countermeasure for the $\eta_T$ pairing; our method is more efficient than the RPC method applied to the original $\eta_T$ pairing algorithm.

An Efficient DPA Countermeasure for the $Eta_T$ Pairing Algorithm over GF($2^n$) Based on Random Value Addition

  • Seo, Seog-Chung;Han, Dong-Guk;Hong, Seok-Hie
    • ETRI Journal
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    • v.33 no.5
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    • pp.780-790
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    • 2011
  • This paper presents an efficient differential power analysis (DPA) countermeasure for the $Eta_T$ pairing algorithm over GF($2^n$). The proposed algorithm is based on a random value addition (RVA) mechanism. An RVA-based DPA countermeasure for the $Eta_T$ pairing computation over GF($3^n$) was proposed in 2008. This paper examines the security of this RVA-based DPA countermeasure and defines the design principles for making the countermeasure more secure. Finally, the paper proposes an efficient RVA-based DPA countermeasure for the secure computation of the $Eta_T$ pairing over GF($2^n$). The proposed countermeasure not only overcomes the security flaws in the previous RVAbased method but also exhibits the enhanced performance. Actually, on the 8-bit ATmega128L and 16-bit MSP430 processors, the proposed method can achieve almost 39% and 43% of performance improvements, respectively, compared with the best-known countermeasure.

Efficient Computation of Eta Pairing over Binary Field with Vandermonde Matrix

  • Shirase, Masaaki;Takagi, Tsuyoshi;Choi, Doo-Ho;Han, Dong-Guk;Kim, Ho-Won
    • ETRI Journal
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    • v.31 no.2
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    • pp.129-139
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    • 2009
  • This paper provides an efficient algorithm for computing the ${\eta}_T$ pairing on supersingular elliptic curves over fields of characteristic two. In the proposed algorithm, we deploy a modified multiplication in $F_{2^{4n}}$ using the Vandermonde matrix. For F, G ${\in}$ $F_{2^{4n}}$ the proposed multiplication method computes ${\beta}{\cdot}F{\cdot}G$ instead of $F{\cdot}G$ with some ${\beta}$ ${\in}$ $F^*_{2n}$ because ${\beta}$ is eliminated by the final exponentiation of the ${\eta}_T$ pairing computation. The proposed multiplication method asymptotically requires only 7 multiplications in $F_{2^n}$ as n ${\rightarrow}$ ${\infty}$, while the cost of the previously fastest Karatsuba method is 9 multiplications in $F_{2^n}$. Consequently, the cost of the ${\eta}_T$ pairing computation is reduced by 14.3%.

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Security Analysis against RVA-based DPA Countermeasure Applied to $Eta_T$ Pairing Algorithm (RVA 기반의 페어링 부채널 대응법에 대한 안전성 분석)

  • Seo, Seog-Chung;Han, Dong-Guk;Hong, Seok-Hie
    • Journal of the Korea Institute of Information Security & Cryptology
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    • v.21 no.2
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    • pp.83-90
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    • 2011
  • Recently, pairings over elliptic curve have been applied for various ID-based encryption/signature/authentication/key agreement schemes. For efficiency, the $Eta_T$ pairings over GF($P^n$) (P = 2, 3) were invented, however, they are vulnerable to side channel attacks such as DPA because of their symmetric computation structure compared to other pairings such as Tate, Ate pairings. Several countermeasures have been proposed to prevent side channel attacks. Especially, Masaaki Shirase's method is very efficient with regard to computational efficiency, however, it has security flaws. This paper examines closely the security flaws of RVA-based countermeasure on $Eta_T$ Pairing algorithm from the implementation point of view.

Efficient Formulas for Cube roots in $F_{3^m}$ for Pairing Cryptography (페어링 암호 연산을 위한 $F_{3^m}$에서의 효율적인 세제곱근 연산 방법)

  • Cho, Young-In;Chang, Nam-Su;Kim, Chang-Han;Park, Young-Ho;Hong, Seok-Hie
    • Journal of the Korea Institute of Information Security & Cryptology
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    • v.21 no.2
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    • pp.3-11
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    • 2011
  • Evaluation of cube roots in characteristic three finite fields is required for Tate (or modified Tate) pairing computation. The Hamming weights (the number of nonzero coefficients) in the polynomial representations of $x^{1/3}$ and $x^{2/3}$ determine the efficiency of cube roots computation, where $F_{3^m}$is represented as $F_3[x]/(f)$ and $f(x)=x^m+ax^k+b{\in}F_3[x]$ (a, $b{\in}F_3$) is an irreducible trinomial. O. Ahmadi et al. determined the Hamming weights of $x^{1/3}$ and $x^{2/3}$ for all irreducible trinomials. In this paper, we present formulas for cube roots in $F_{3^m}$ using the shifted polynomial basis(SPB). Moreover, we provide the suitable shifted polynomial basis bring no further modular reduction process.