On the Linear Complexity Profile of Nonlinear Congruential Pseudorandom Number Generators with Dickson Polynomials

HASSAN ALY; ARNE WINTERHOf

首页> 外文期刊>Designs, Codes and Crytography >On the Linear Complexity Profile of Nonlinear Congruential Pseudorandom Number Generators with Dickson Polynomials

【24h】

On the Linear Complexity Profile of Nonlinear Congruential Pseudorandom Number Generators with Dickson Polynomials

机译：具有Dickson多项式的非线性同余伪随机数生成器的线性复杂度分布

获取原文

获取原文并翻译 | 示例

掌桥外文数据库（机构版） >>

开具论文收录证明 >>

文献代查 >>

页面导航

摘要
著录项
相似文献
相关主题

摘要

Linear complexity and linear complexity profile are important characteristics of a sequence for applications in cryptography and Monte-Carlo methods. The nonlinear congruential method is an attractive alternative to the classical linear congruential method for pseudorandom number generation. Recently, a weak lower bound on the linear complexity profile of a general nonlinear congruential pseudorandom number generator was proven by Gutierrez, Shparlinski and the first author. For most nonlinear generators a much stronger lower bound is expected. Here, we obtain a much stronger lower bound on the linear complexity profile of nonlinear congruential pseudorandom number generators with Dickson polynomials.

机译：线性复杂度和线性复杂度分布图是密码学和蒙特卡洛方法中应用程序序列的重要特征。非线性同余方法是用于伪随机数生成的经典线性同余方法的一种有吸引力的替代方法。最近，古铁雷斯，Shparlinski和第一作者证明了一般非线性同余伪随机数发生器的线性复杂度分布的弱下限。对于大多数非线性发生器，期望有一个更强的下限。在这里，我们获得了具有Dickson多项式的非线性同余伪随机数生成器的线性复杂度分布的更强下限。

著录项

来源
《Designs, Codes and Crytography》 |2006年第2期|p.155-162|共8页
作者
HASSAN ALY; ARNE WINTERHOf;
展开▼
作者单位

Department of Mathematics, Faculty of Science, Cairo University, Giza, Egypt;

展开▼
收录信息美国《科学引文索引》(SCI);美国《工程索引》(EI);
原文格式 PDF
正文语种 eng
中图分类高等数学;
关键词
linear complexity profile; nonlinear congruential generator; dickson polynomials; cryptography;

机译：线性复杂度轮廓非线性同余生成器狄森多项式密码术;

相似文献

外文文献
中文文献
专利

1. On the linear complexity profile of nonlinear congruential pseudorandom number generators with Redei functions [J] . Wilfried Meidl, Arne Winterhof Finite fields and their applications . 2007,第3期

机译：具有Redei函数的非线性同余伪随机数生成器的线性复杂度分布
2. On the linear complexity profile of nonlinear congruential pseudorandom number generators of higher orders [J] . Topuzoglu A, Winterhof A Applicable algebra in engineering, communication and computing . 2005,第4期

机译：高阶非线性同余伪随机数生成器的线性复杂度分布
3. Lattice Structure and Linear Complexity Profile of Nonlinear Pseudorandom Number Generators [J] . Gerhard Dorfer, Arne Winterhof Applicable algebra in engineering, communication and computing . 2003,第6期

机译：非线性伪随机数发生器的格结构和线性复杂度分布
4. Multiplicative Character Sums with Counter-Dependent Nonlinear Congruential Pseudorandom Number Generators [C] . Domingo Gomez Sequences and their applications - SETA 2010 . 2010

机译：具有相依依赖的非线性同余伪随机数生成器的乘法字符和
5. Nonlinear mixed effects mixture model: A model for clustering nonlinear longitudinal profiles [D] . Harring, Jeffrey Robert 2005

机译：非线性混合效应混合模型：用于对非线性纵向轮廓进行聚类的模型
6. Analysis of Polynomial Nonlinearity Based on Measures of Nonlinearity Algorithms [O] . Mahendra Mallick, Xiaoqing Tian 2020

机译：基于非线性算法测度的多项式非线性分析
7. On the linear complexity profile of nonlinear congruential pseudorandom number generators with Redei functions [O] . Meidl, Wilfried, Winterhof, Arne 2007

机译：具有Redei函数的非线性同余伪随机数生成器的线性复杂度分布

On the Linear Complexity Profile of Nonlinear Congruential Pseudorandom Number Generators with Dickson Polynomials

摘要

著录项

相似文献

相关主题

期刊订阅