Determination of all complete mappings of Fq2 of the form aX3q+bX2q+1+cXq+2+dX3
Abstract
For each prime power q, we determine all polynomials over Fq2 of the form f(X) := aX3q+bX2q+1+cXq+2+dX3 which induce complete mappings of Fq2, in the sense that each of the functions x --> f(x) and x --> f(x)+x permutes Fq2. This is the first result in the literature which classifies the complete mappings among some class of polynomials with arbitrarily large degree over finite fields of arbitrary characteristic. We also determine all permutation polynomials over Fq2 of the form Xq+2+bXq+cX, and all permutations of (Fq)2 induced by maps of the form (x,y) --> (x3-exy2-ax-by, y3-cx-dy) where either e=0 or 3|q. The latter results add to the small number of results in the literature classifying all permutations induced by maps of prescribed forms.
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