1. Efficient Bit-Parallel Multiplier for Irreducible Pentanomials Using a Shifted Polynomial Basis.
- Author
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Sun-Mi Park, Ku-Young Chang, and Dowon Hong
- Subjects
COMPUTER arithmetic ,POLYNOMIALS ,COMPUTER algorithms ,COMPUTER programming ,COMPUTER architecture ,SYSTEMS development ,SYSTEMS design ,COMPUTER science ,COMPUTER software - Abstract
In this paper, we present a bit-parallel multiplier for GF(2
m ) defined by an irreducible pentanomial ixm + xk + x3 k + x2 k + 1, where 1 ≤ k1 1 < k2 < k3 ≤ m/2. In order to design an efficient bit-parallel multiplier, we introduce a shifted polynomial basis and modify a reduction matrix presented by Reyhani-Masoleh and Hasan. As a result, the time complexity of the proposed multiplier is TA + (3 + [log2 (m - 1)])Tx , where TA and Tx are the delay of one AND and one XOR gate, respectively. This result matches or outperforms the previously known results. On the other hand, the proposed multiplier has the same space complexity as the previously known multipliers except for special types of irreducible pentanomials. Note that its hardware architecture is similar to that presented by Reyhani-Masoleh and Hasan. [ABSTRACT FROM AUTHOR]- Published
- 2006
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