Switchings of semifield multiplications

Abstract

Let B(X,Y) be a polynomial over Fqn which defines an Fq-bilinear form on the vector space Fqn, and let be a nonzero element in Fqn. In this paper, we consider for which B(X,Y), the binary operation xy+B(x,y) defines a (pre)semifield multiplication on Fqn. We prove that this question is equivalent to finding q-linearized polynomials L(X)∈Fqn[X] such that Trqn/q(L(x)/x)≠ 0 for all x∈Fqn*. For n 4, we present several families of L(X) and we investigate the derived (pre)semifields. When q equals a prime p, we show that if n>12(p-1)(p2-p+4), L(X) must be a0 X for some a0∈Fpn satisfying Trqn/q(a0)≠ 0. Finally, we include a natural connection with certain cyclic codes over finite fields, and we apply the Hasse-Weil-Serre bound for algebraic curves to prove several necessary conditions for such kind of L(X).