THE LINEAR SPECTRUM OF QUADRATIC APN FUNCTIONS

被引:0
|
作者
Gorodilova, A. A. [1 ]
机构
[1] Sobolev Inst Math, Novosibirsk, Russia
来源
PRIKLADNAYA DISKRETNAYA MATEMATIKA | 2016年 / 34卷 / 04期
关键词
APN function; associated Boolean function; linear spectrum; Gold function;
D O I
10.17223/20710410/34/1
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
Almost perfect nonlinear (APN) functions are studied. We introduce the linear spectrum Lambda(F) = (lambda(F)(0), ..., lambda(F)(2n-1)) of a quadratic APN function F, where lambda(F)(k) equals the number of linear functions L such that vertical bar{a is an element of F-2(n) \ {0} : B-a(F) = B-a(F + L)}vertical bar = k and B-a(F) = {F(x)+F(x+a) : x is an element of F-2(n)}. We prove that lambda(F)(k) = 0 for all even k <= 2(n)-2 and for all k < (2(n)-1)/3, where F is a quadratic APN function in even number of variables n. Linear spectra for APN functions in small number of variables n = 3,4,5,6 are computed and presented. We consider APN Gold functions F(x) = x(2k+1) for (k,n) = 1 and prove that lambda(F)(2n-1) = 2(n+n/2) if n = 4t for some t and k = n/2 +/- 1, and lambda(F)(2n-1) = 2(n) otherwise.
引用
收藏
页码:5 / 16
页数:12
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