Bilinear Complexity of the Multiplication in a Finite Extention of a Finite Field

Let q=p^r be a prime power and F_q be the finite field with q elements. We study the multiplication of two polynomials in F_q [X], with degree ≤ n-1, modulo an irreducible polynomial of degree n, namely the multiplication in the finite field F_qⁿ.

We want to find a multiplication algorithm involving two variables in F_qⁿ minimizing the number of bilinear multiplications (i.e. involving two variables) in F_q. We don’t take in account multiplications of a variable in F_q by a constant in F_q (However these linear operations have a cost).

It turns out that the number of bilinear operations is related to a tensor expression of the multiplication and that the problem is to find the rank of this tensor.

We will give, using interpolation on algebraic curves over the finite field F_q, a sharp estimate for this bilinear complexity.