ESTIMATION OF MULTILEVEL DIGITAL SIGNALS IN THE PRESENCE OF ARBITRARY IMPULSIVE INTERFERENCE

In this paper, we first study the a posteriori probability density function of the state of a discrete-time system given the measurement data. By applying the Bayesian law to the state and measurement equations of the stochastic system, the a posteriori density is obtained in closed-form and computed recursively for arbitrary i.i.d. state noise and any discrete-type measurement noise (or multilevel digital signal). Then, our effort concentrates on the estimation of impulsive noise which interferes the multilevel signal of interest. By considering the L(p)-metric performance criterion, where 0 < p less than or equal to 2, the corresponding estimators are obtained. Using a new damping function scheme, the performance of the new estimators is improved even further. As an example, a highly impulsive state process driven by noise with symmetric alpha-stable distribution is estimated and then removed from the measurement data; after that, the multi-level digital signal is recovered.