Abstract
When laser pulses are reflected by targets that have range spreads larger than the transmitted pulse width, the width of the received pulses will be longer than the correlation length of the speckle-induced fluctuations. As a consequence, speckle will cause random small-scale fluctuations within the received pulse that will distort its shape. This phenomenon is called time-resolved speckle. In laser ranging and altimetry, the random pulse distortion caused by time-resolved speckle can seriously degrade the timing accuracy of the receivers. In this paper, we study the statistical properties of time-resolved speckle and the problem of estimating the arrival times of laser pulses in its presence. The maximum-likelihood (ML) estimator of the pulse arrival time is derived, and its performance is evaluated for pulse reflections from flat diffuse targets. The performance of the ML estimator is compared with the performance of several suboptimal estimators. When the signal level is high, speckle noise places a fundamental limit on the accuracy of the suboptimal estimators. It is shown that the ML estimator performs considerably better than the suboptimal estimators and that its accuracy improves as the width of the receiver observation interval increases.
© 1985 Optical Society of America
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