Abstract :
In this correspondence, we focus on bent functions of the form F(2 n) rarr F(2) where x rarr Tr(alphaxd). The main contribution of this correspondence is, that we prove that for n=4r, r odd, the exponent d=(2r+1)2 allows the construction of bent functions. This open question has been posed by Canteaut based on computer experiments. As a consequence for each of the well understood families of bent functions, we now know an exponent d that yields to bent functions of the given type
Keywords :
Boolean functions; Walsh functions; transforms; Boolean function; monomial bent function; power function; trace expansion; Boolean functions; Concrete; Cryptography; Equations; Fourier transforms; Linearity; Bent functions; Boolean functions; monomial Boolean functions; power functions; trace expansion;
