论文信息 - Further results on planar DO functions and commutative semifields

Further results on planar DO functions and commutative semifields

It is proven that any Dembowski–Ostrom polynomial is planar if and only if its evaluation map is 2-to-1, which can be used to explain some known planar Dembowski–Ostrom polynomials. A direct connection between a planar Dembowski–Ostrom polynomial and a permutation polynomial is established if the corresponding semifield is of odd dimension over its nucleus. In addition, all commutative semifields of order 35 are classified.

Xiangyong Zeng | Guobiao Weng | Xiangyong Zeng | Guobiao Weng

[1] Robert S. Coulter,et al. Planar Functions and Planes of Lenz-Barlotti Class II , 1997, Des. Codes Cryptogr..

[2] Cunsheng Ding,et al. A family of skew Hadamard difference sets , 2006, J. Comb. Theory, Ser. A.

[3] Siu Lun Ma,et al. A survey of partial difference sets , 1994, Des. Codes Cryptogr..

[4] W. J. Thron,et al. Encyclopedia of Mathematics and its Applications. , 1982 .

[5] Paul Camion,et al. Antisymmetric difference sets , 1972 .

[6] Robert S. Coulter,et al. Dembowski-Ostrom polynomials from Dickson polynomials , 2010, Finite Fields Their Appl..

[7] Lei Hu,et al. Some results on skew Hadamard difference sets , 2009, Des. Codes Cryptogr..

[8] Rainer Bodendiek,et al. Contemporary methods in graph theory , 1990 .

[9] Robert S. Coulter,et al. Commutative presemifields and semifields , 2008 .

[10] D. R. Hughes. Partial Difference Sets , 1956 .

[11] Siu Lun Ma,et al. Polynomial addition sets and symmetric difference sets , 1990 .

[12] E. C Johnsen,et al. Skew-hadamard abelian group difference sets , 1966 .

[13] A. A. Albert,et al. On nonassociative division algebras , 1952 .

[14] Rudolf Lide,et al. Finite fields , 1983 .

[15] Alexander Pott,et al. Some Theorems on Planar Mappings , 2008, WAIFI.

[16] Qing Xiang,et al. Pseudo-Paley graphs and skew Hadamard difference sets from presemifields , 2007, Des. Codes Cryptogr..

[17] Dieter Jungnickel,et al. Some geometric aspects of finite abelian group , 2006 .