Title :
On modeling of self-similar random processes in discrete-time
Author :
Zhao, Wei ; Rao, Raghuveer M.
Author_Institution :
Dept. of Electr. Eng., Rochester Inst. of Technol., NY, USA
Abstract :
Novel models of stochastic self-similar processes in the discrete-time domain are presented. The results developed are based on the definition of a discrete-time scaling (dilation) operation through a mapping between the discrete and continuous frequencies. It is shown that it is possible to have continuous scaling factors through this operation even though the signal itself is discrete. White noise driven system models of stationary stochastic self-similar random processes are studied. The construction of discrete-time linear scale-invariant (LSI) systems and the LSI system model of discrete-time, non-stationary self-similar random signals are provided. It is shown that a wide class of non-trivial discrete-time self-similar random signals can be constructed through the models presented in the paper
Keywords :
fractals; random processes; signal representation; stochastic processes; time-frequency analysis; white noise; continuous scaling factors; dilation operation; discrete signals; discrete-time domain; discrete-time linear scale-invariant systems; discrete-time scaling operation; modeling; non-trivial signals; nonstationary self-similar random signals; self-similar random processes; stationary processes; stochastic self-similar processes; white noise driven system models; Discrete transforms; Drives; Fourier transforms; Frequency; Large scale integration; Random processes; Stochastic processes; Stochastic resonance; Stochastic systems; White noise;
Conference_Titel :
Time-Frequency and Time-Scale Analysis, 1998. Proceedings of the IEEE-SP International Symposium on
Conference_Location :
Pittsburgh, PA
Print_ISBN :
0-7803-5073-1
DOI :
10.1109/TFSA.1998.721428
