Author Info
Name
Affiliation
Papers
KANGQUAN LI
Natl Univ Def Technol, Coll Sci, Changsha 410073, Hunan, Peoples R China
19
Collaborators
Citations 
PageRank 
21
42
7.56
Referers 
Referees 
References 
68
91
91
Title
Citations
PageRank
Year
Two New Families of Quadratic APN Functions00.342022
New Constructions of Complete Permutations00.342021
Finding Compositional Inverses of Permutations From the AGW Criterion00.342021
More Permutations And Involutions For Constructing Bent Functions00.342021
Further Study of 2-to-1 Mappings Over F<sub>2<sup>n</sup></sub>00.342021
Cryptographically Strong Permutations From The Butterfly Structure00.342021
Binary linear codes with few weights from two-to-one functions00.342021
A Complete Characterization of the APN Property of a Class of Quadrinomials10.352021
On a conjecture about a class of permutation quadrinomials10.352020
A link between two classes of permutation polynomials00.342020
A new algorithm on the minimal rational fraction representation of feedback with carry shift registers00.342020
New constructions of involutions over finite fields.10.362020
Further study of 2-to-1 mappings over F<inf>2</inf><sup>n</sup>00.342019
New Results about the Boomerang Uniformity of Permutation Polynomials.60.452019
Compositional inverses of permutation polynomials of the form <Emphasis Type="Italic">x</Emphasis><Superscript><Emphasis Type="Italic">r</Emphasis></Superscript><Emphasis Type="Italic">h</Emphasis>(<Emphasis Type="Italic">x</Emphasis><Superscript><Emphasis Type="Italic">s</Emphasis></Superscript>) over finite fields10.402019
New Classes Of Efficient Mds Transformations00.342019
Permutation polynomials of the form cx + Trql/q(xa) and permutation trinomials over finite fields with even characteristic.30.382018
New permutation trinomials constructed from fractional polynomials70.542016
New Classes of Permutation Binomials and Permutation Trinomials over Finite Fields221.022015