Title :
Optimal differentiation based on stochastic signal models
Author :
Carlsson, Bengt ; Ahlén, Anders ; Sternad, Mikael
Author_Institution :
Dept. of Technol., Uppsala Univ., Sweden
fDate :
2/1/1991 12:00:00 AM
Abstract :
The problem of estimating the time derivative of a signal from sampled measurements is addressed. The measurements may be corrupted by colored noise. A key idea is to use stochastic models of the signal to be differentiated and of the measurement noise. Two approaches are suggested. The first is based on a continuous-time stochastic process as a model of the signal. The second uses a discrete-time ARMA model of the signal and a discrete-time approximation of the derivative operator. Digital differentiators are presented in a shift operator polynomial form. They minimize the mean-square estimation error, and are calculated from a linear polynomial equation and a polynomial spectral factorization. The three obstacles to perfect differentiation, namely a finite smoothing lag, measurement noise, and aliasing effects due to sampling, are discussed
Keywords :
differentiation; filtering and prediction theory; signal processing; stochastic systems; aliasing effects; colored noise; continuous-time stochastic process; derivative operator; digital differentiators; discrete-time ARMA model; discrete-time approximation; finite smoothing lag; linear polynomial equation; mean-square estimation error; measurement noise; optimal differentiation; polynomial spectral factorization; sampled measurements; shift operator polynomial form; signal processing; stochastic signal models; time derivative; Colored noise; Equations; Estimation error; Noise measurement; Polynomials; Signal processing; Smoothing methods; Stochastic processes; Stochastic resonance; Time measurement;
Journal_Title :
Signal Processing, IEEE Transactions on
