Regular complete permutation polynomials over quadratic extension fields
Abstract
Let r≥ 3 be any positive integer which is relatively prime to p and q2 1 r. Let τ1, τ2 be any permutation polynomials over Fq2, σM is an invertible linear map over Fq2 and σ=τ1σMτ2. In this paper, we prove that, for suitable τ1, τ2 and σM, the map σ could be r-regular complete permutation polynomials over quadratic extension fields.
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