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IJNSEC
2010

Computing the Modular Inverse of a Polynomial Function over GF(2P) Using Bit Wise Operation

13 years 6 months ago
Computing the Modular Inverse of a Polynomial Function over GF(2P) Using Bit Wise Operation
Most public key crypto systems use finite field modulo arithmetic. This modulo arithmetic is applied on real numbers, binary values and polynomial functions. The computation cost is based on how it works with minimum use of scarce resources like processor and memory We have implemented the determination of the multiplicative inverse of a polynomial over GF(2p ) with minimum computational cost. The "Extended Euclidean Algorithm" (EEA) has been demonstrated to work very well manually for integers and polynomials. However polynomial manipulation cannot be computerized directly. We have implemented the same by using simple bit wise shift and XOR operations. In small applications like smart cards, mobile devices and other small memory devices, this method works very well. To the best of our knowledge, the proposed algorithm seems to be the first, efficient and cost effective implementation of determining the multiplicative inverse of polynomials over GF(2p ) using computers. As t...
Rajaram Ramasamy, Amutha Prabakar Muniyandi
Added 18 May 2011
Updated 18 May 2011
Type Journal
Year 2010
Where IJNSEC
Authors Rajaram Ramasamy, Amutha Prabakar Muniyandi
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