Bandwidth-efficient constant-energy trellis-coded modulation schemes with prescribed decoding delay

Abstract

For a general class of constant-energy trellis-coded modulation (TCM) schemes with 2/sup /spl nu// states, necessary and sufficient conditions to guarantee that a maximum-likelihood sequence estimator (MSLE) can decode each symbol with a fixed delay of /spl nu/ symbols are derived. Additive white Gaussian noise (AWGN) is assumed. Minimum shift keying (MSK) is a special case that belongs to the family of modulation schemes with /spl nu/=1. It is shown that when these conditions are met, the minimum squared Euclidean distance is upper-bounded by 4E/sub s/, where E/sub s/ is the signal's energy per interval. Necessary and sufficient conditions to achieve the upper bound are given and it is shown that these conditions are met if and only if the TCM scheme can be implemented as pulse amplitude modulation (PAM) using a pulse that extends over /spl nu/+1 symbols. Signals that achieve this upper bound and maximize the power within a given bandwidth are found. The bandwidth efficiency of such schemes is significantly higher than that of MSK.