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文件名称：Some properties of the Logistic map over the finite field and its application
文件大小：2.12MB
文件格式：PDF
更新时间：2021-12-21 16:25:42
Key stream g Logistic map The Logistic map is a classical chaotic system and has been used as a chaotic cipher in the real number field. This inevitably leads to the degradation of finite precision under the computer environment, and it also is very difficult to guarantee the security of the cryptosystem using the Logistic map over the real number field. To overcome these drawbacks, in this paper, we extend the Logistic map-3 to the finite field Z 3 n , and give theoretical analysis about some period properties of the Logistic map-3 over Z 3 n . Moreover, we discuss the control parameters which can change the behavior of the mapping, and also find that the maximum period can change with the control parameter. Furthermore, we analyze some characteristics including maximum period, generation time, NIST test, power spectrum, correlation property, phase diagram and Lyapunov exponent. Simulation results show that the period of Logistic map-3 over Z 3 n is longer than Logistic map-1 over Z 3 n , and much longer than Logistic map-1 over Z 2 n , and the same as Logistic map-2 over Z 3 n . Simulation experiments also show that the Logistic map-3 over the finite field has some good features including non-periodic, random, noise-like properties, continuous spectrum, good correlation, well uniform distribution, controllable length of generated sequence, positive Lyapunov exponent, and good sequence generation speed. Therefore, we attempt to design a nonlinear transformation based key stream generator by using the Logistic map-3 over Z 3 n and apply to image encryption. The performance analyses including statistical analysis, Shannon entropy analysis, differential attack analysis, and speed analysis also show that our proposed method may be suitable for practical cryptographic application