The complete cubic Walsh spectrum of a permutation-inverse Boolean family
Abstract
Let q=2e with e2 even, put d=(q2+q+1)/3, and let σ(X)=X+Xd+Xdq be the permutation of Fq2 introduced by Ding, Qu, Wang, Yuan, and Yuan. For α∈ Fq*, define the Boolean function \[ fα(x)=Trq2(α(σ-1(x))3), x∈ Fq2. \] In this paper, we determine the complete Walsh distribution of fα in the remaining cubic case α∈( Fq*)3. More precisely, these functions are not bent but are 2-plateaued: their Walsh values are precisely 0 and 2q, with exact multiplicities. The main new tool is a completion method for the outside Walsh coefficients: the punctured Fourier transform arising from the outside reduction is filled on the missing line, a modification invisible to outside frequencies, and the completed function is then identified with a Boolean component of a Kasami APN monomial. The APN property supplies a fourth-moment identity which, together with the known subfield spectrum and a Hasse divisibility congruence, forces the pointwise cubic spectrum.
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