A new class of irreducible pentanomials for polynomial based multipliers in binary fields

Abstract

We introduce a new class of irreducible pentanomials over F2 of the form f(x) = x2b+c + xb+c + xb + xc + 1. Let m=2b+c and use f to define the finite field extension of degree m. We give the exact number of operations required for computing the reduction modulo f. We also provide a multiplier based on Karatsuba algorithm in F2[x] combined with our reduction process. We give the total cost of the multiplier and found that the bit-parallel multiplier defined by this new class of polynomials has improved XOR and AND complexity. Our multiplier has comparable time delay when compared to other multipliers based on Karatsuba algorithm.