참고문헌 (13)

1. R. Lidl and H. Niederreiter, Introduction to finite fields and its applications, Cambridge Univ. Press, 1994 

2. A.J. Menezes, I.F. Blake, X. Gao, R.C. Mullin, S.A. Vanstone, and T. Yaghoobian, Applications of finitr fields, Kluwer Academic, 1993 

3. C.K. Koc and B. Sunar, 'Low-complexity bit-parallel canonical and normal basis multipliers for a class of finite fields', IEEE Trans. vol.47, no.3, pp. 353-356, Mar, 1998 

   상세보기

4. H. Wu and M.A. Hasan, 'Low Complexity bit-parallel multipliers for a class of finite fields', IEEE Trans. vol.47, no.8, pp. 883-887, Aug., 1998 

   상세보기

5. B. Sunar and C.K. Koc,'An efficient optimal normal basis type II multiplier', IEEE Trans. vol.50, no.1, pp. 83-88, Jan., 2001 

   상세보기

6. C.C Wang, T.K. Truong, H.M. Shao, L.J. Deutsch, J.K. Omura, and I.S. Reed,'VLSI architectures for computing multiplications and inverses in GF( $2^{m}$ )', IEEE Trans. vol.34, no.8, pp. 709-716, Aug., 1985 

   상세보기

7. A. Reyhani-Masolleh and M.H. Hasan, 'A new construction of Massey-Omura parallel multiplier over GF( $2^{m}$ )', IEEE Trans. vol.51, no.5, pp. 512-520, May, 2002 

8. C.H. Kim, S. Oh, and J. Lim,'A new hardware architecture for operations in GF( $2^{n}$ )', IEEE Trans. vol.51, no.1, pp. 90-92, Jan, 2002 

   상세보기

9. IEEE P1363, Standard specifications for public key cryptography, Draft 13, 1999 

10. ANSI X 9.63, Public key cryptography for the financial services industry : Elliptic curve key agreement and transport protocols, draft, 1998 

11. Nat'l Inst. of Standard and Technology, Digital Signature Standard, FIPS 186-2, Jan. 2000 

12. M. Elia and M. Leone, 'On the In herent Space Complexity of Fast Parallel Multipliers for GF $2^{m}$ ', IEEE Trans. Computers, Vol. 51, no. 3, pp.346-351, Mar. 2002 

    상세보기

13. S. Gao Jr. and H.W. Lenstra, 'Optimal normal bases', Designs, Codes and Cryptography, vol. 2, pp.315-323, 1992 

    상세보기

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