2020
DOI: 10.1049/iet-rsn.2020.0168
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Compact CRB for delay, Doppler, and phase estimation – application to GNSS SPP and RTK performance characterisation

Abstract: The derivation of tight estimation lower bounds is a key tool to design and assess the performance of new estimators. In this contribution, first, the authors derive a new compact Cramér-Rao bound (CRB) for the conditional signal model, where the deterministic parameter's vector includes a real positive amplitude and the signal phase. Then, the resulting CRB is particularised to the delay, Doppler, phase, and amplitude estimation for band-limited narrowband signals, which are found in a plethora of application… Show more

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Cited by 38 publications
(64 citation statements)
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“…Such a CRB is very convenient because it only depends on the signal sample, and it is summarized in the sequel for completeness. Considering the joint time-delay and phase estimation resorting to Model ( 6 ), the CRB is given by [ 37 ]: where Im represents the imaginary operator, , and the energy of the signal. and are defined as (for ): …”
Section: Gnss Receiver Signal Processingmentioning
confidence: 99%
“…Such a CRB is very convenient because it only depends on the signal sample, and it is summarized in the sequel for completeness. Considering the joint time-delay and phase estimation resorting to Model ( 6 ), the CRB is given by [ 37 ]: where Im represents the imaginary operator, , and the energy of the signal. and are defined as (for ): …”
Section: Gnss Receiver Signal Processingmentioning
confidence: 99%
“…μ h = 1 and σ 2 h ¼ 0) the LLR in Equation 24reduces to the Gaussian LLR solution in Equation 7. Notice that Equation 24requires the knowledge of σ 2 , as well as μ h and σ 2 h . The latter values can be obtained by resorting to the maximum likelihood (ML) estimates [17]:…”
Section: Bayesian Llr Linear Approximationmentioning
confidence: 99%
“…Note from Equation (25) that only simple arithmetical operations are required. Again, the complexity of the method depends on the number of samples K used to estimate μ h and σ 2 h , but for equal number of samples, the Bayesian solution is computationally less expensive than the best linear one.…”
Section: Two-state Prieto Channelmentioning
confidence: 99%
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