• Journal of the Institute of Electronics Engineers of Korea SC
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• v.40 no.6
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• pp.24-30
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• 2003

This study focuses on the arithmetical methodology and hardware implementation of low system-complexity A $B^2$＋C operator over GF(2$^{m}$ ) using the irreducible AOP of degree m. The proposed parallel-in parallel-out operator is composed of CS, PP, and MS modules, each can be established using the array structure of AND and XOR gates. The proposed multiplier is composed of (m＋1)$^2$ 2-input AND gates and (m＋1)(m＋2) 2-input XOR gates. And the minimum propagation delay is $T_{A}$ ＋(1＋$\ulcorner$lo $g_2$$^{m}$ $\lrcorner$) $T_{x}$ . Comparison result of the related A $B^2$＋C operators of GF(2$^{m}$ ) are shown by table, It reveals that our operator involve more lower circuit complexity and shorter propagation delay then the others. Moreover, the interconnections of the out operators is very simple, regular, and therefore well-suited for VLSI implementation.

• The Journal of Society for e-Business Studies
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• v.11 no.2
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• pp.1-11
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• 2006

This paper proposes an efficient inversion algorithm for Galois field GF(2n) by using a modified multi-bit shifting method based on the Montgomery algorithm. It is well known that the efficiency of arithmetic algorithms depends on the basis and many foregoing papers use either polynomial or optimal normal basis. An inversion algorithm, which modifies a multi-bit shifting based on the Montgomery algorithm, is studied. Trinomials and AOPs (all-one polynomials) are tested to calculate the inverse. It is shown that the suggested inversion algorithm reduces the computation time up to 26 % of the forgoing multi-bit shifting algorithm. The modified algorithm can be applied in various applications and is easy to implement.