Mastrovito Multiplier for All Trinomials

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May 1999 (vol. 48 no. 5)

pp. 522-527

	ASCII Text	x
	B. Sunar, Ç.k. Koç, "Mastrovito Multiplier for All Trinomials," IEEE Transactions on Computers, vol. 48, no. 5, pp. 522-527, May, 1999.

	BibTex	x
	@article{ 10.1109/12.769434, author = {B. Sunar and Ç.k. Koç}, title = {Mastrovito Multiplier for All Trinomials}, journal ={IEEE Transactions on Computers}, volume = {48}, number = {5}, issn = {0018-9340}, year = {1999}, pages = {522-527}, doi = {http://doi.ieeecomputersociety.org/10.1109/12.769434}, publisher = {IEEE Computer Society}, address = {Los Alamitos, CA, USA}, }

	RefWorks Procite/RefMan/Endnote	x
	TY - JOUR JO - IEEE Transactions on Computers TI - Mastrovito Multiplier for All Trinomials IS - 5 SN - 0018-9340 SP522 EP527 EPD - 522-527 A1 - B. Sunar, A1 - Ç.k. Koç, PY - 1999 KW - Finite fields KW - multiplication KW - standard basis KW - irreducible trinomial. VL - 48 JA - IEEE Transactions on Computers ER -

B. Sunar

Ç.k. Koç

DOI Bookmark: http://doi.ieeecomputersociety.org/10.1109/12.769434

Abstract—An efficient algorithm for the multiplication in $GF(2^m)$ was introduced by Mastrovito. The space complexity of the Mastrovito multiplier for the irreducible trinomial $x^m+x+1$ was given as $m^2-1$ XOR and $m^2$ AND gates. In this paper, we describe an architecture based on a new formulation of the multiplication matrix and show that the Mastrovito multiplier for the generating trinomial $x^m+x^n+1$, where $m \not=2n$, also requires $m^2-1$ XOR and $m^2$ AND gates. However, $m^2-m/2$ XOR gates are sufficient when the generating trinomial is of the form $x^m+x^{m/2}+1$ for an even $m$. We also calculate the time complexity of the proposed Mastrovito multiplier and give design examples for the irreducible trinomials $x^7+x^4+1$ and $x^6+x^3+1$.

[1] G. Golub and C. Van Loan, Matrix Computations, third ed. Baltimore: Johns Hopkins Univ. Press, 1996.[2] J. Guajardo and C. Paar, “Efficient Algorithms for Elliptic Curve Cryptosystems,” Advances in Cryptology—CRYPTO 97, B.S. Kaliski, ed., pp. 342-356, 1997.[3] Ç.K. Koç and B. Sunar, Low-Complexity Bit-Parallel Canonical and Normal Basis Multipliers for a Class of Finite Fields IEEE Trans. Computers, vol. 47, no. 3, pp. 353-356, Mar. 1998.[4] R. Lidl and H. Niederreiter,An Introduction to Finite Fields and Their Applications.Cambridge: Cambridge Univ. Press, 1986.[5] E.D. Mastrovito,"VLSI Design for Multiplication over Finite Fields," LNCS-357, Proc. AAECC-6, pp. 297-309,Rome, July 1988, Springer-Verlag. [6] E.D. Mastrovito, “VLSI Architectures for Computation in Galois Fields,” PhD thesis, Linköping Univ., Dept. of Electrical Eng., Linköping, Sweden, 1991.[7] Applications of Finite Fields, A.J. Menezes, ed. Boston: Kluwer Academic, 1993.[8] A.J. Menezes, Elliptic Curve Public Key Cryptosystems. Boston: Kluwer Academic, 1993.[9] C. Paar, “Efficient VLSI Architectures for Bit Parallel Computation in Galois Fields,” PhD thesis, Universität GH Essen, VDI Verlag, 1994.[10] C. Paar, “A New Architecture for a Parallel Finite Field Multiplier with Low Complexity Based on Composite Fields,” IEEE Trans. Computers, vol. 45, no. 7, pp. 846-861, July 1996.[11] C. Paar, private communication, 1997.

Index Terms:

Finite fields, multiplication, standard basis, irreducible trinomial.

Citation:

B. Sunar, Ç.k. Koç, "Mastrovito Multiplier for All Trinomials," IEEE Transactions on Computers, vol. 48, no. 5, pp. 522-527, May 1999, doi:10.1109/12.769434

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