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= Permutation Polynomials in even characteristic = | = Permutation Polynomials in even characteristic = | ||
* [[Trinomials]] | * [[Trinomials]] |
Revision as of 13:20, 12 December 2022
Known instances of APN functions over [math]\displaystyle{ \mathbb{F}_{2^n} }[/math]
Known families of APN functions
- Known infinite families of APN power functions over GF(2^n)
- Known infinite families of quadratic APN polynomials over GF(2^n)
On known instances in small dimensions
Power functions
- APN power functions over GF(2^n) with n less than or equal to 13
- Inverses of known APN power permutations over GF(2^n) with n less than or equal to 129
Quadratic functions
Equivalences, inequivalences and invariants
- CCZ-inequivalent representatives from the known APN families for dimensions up to 11
- Walsh spectra of all known APN functions over GF(2^8)
- CCZ-equivalence of Families of APN Polynomials over GF(2^n) from the table (for n between 6 and 11)
- CCZ-invariants for all known APN functions in dimension 7
- CCZ-invariants for all known APN functions in dimension 8
- Sigma multiplicities for APN functions in dimensions up to 10
Other instances
- Known switching classes of APN functions over GF(2^n) for n = 5,6,7,8
- APN functions obtained via polynomial expansion in small dimensions
- Classification of Quadratic APN Trinomials, Quadrinomials, Pentanomials, Hexanomials (CCZ-inequivalent with infinite monomial families) in Small Dimensions with all Coefficients equal to 1
- APN polynomials over GF(2^n) CCZ-inequivalent to quadratic functions and monomials
- Lower bounds on APN-distance for all known APN functions
Misceallaneous results
- Some APN functions CCZ-equivalent to Gold functions and EA-inequivalent to power functions over GF(2^n)
- Some APN functions CCZ-equivalent to x^3 + tr_n(x^9) and CCZ-inequivalent to the Gold functions over GF(2^n)
On other differential uniformities
- Differential uniformity of all power functions over GF(2^n) with n less than or equal to 13
- Differentially 4-uniform permutations