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LowSNR limit of the CramerRao bound for estimating the carrier phase and frequency of a PAM, PSK or QAM waveform
 IEEE Communications Letters
, 2001
"... Abstract—In this letter we consider the Cramer–Rao bound (CRB) for the estimation of the time delay of a noisy linearly modulated signal with random data symbols and random carrier phase. Because of the presence of the nuisance parameters (i.e., data symbols and carrier phase), a closedform express ..."
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Cited by 20 (12 self)
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Abstract—In this letter we consider the Cramer–Rao bound (CRB) for the estimation of the time delay of a noisy linearly modulated signal with random data symbols and random carrier phase. Because of the presence of the nuisance parameters (i.e., data symbols and carrier phase), a closed
The true CramerRao Bound for Timing . . .
"... This contribution derives the CramerRao bound (CRB) related to the estimation of the time delay of a linearly modulated bandpass signal with unknown carrier phase and frequency. We consider the following two scenarios: (i) joint estimation of the time delay, the carrier phase and the carrier frequ ..."
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This contribution derives the CramerRao bound (CRB) related to the estimation of the time delay of a linearly modulated bandpass signal with unknown carrier phase and frequency. We consider the following two scenarios: (i) joint estimation of the time delay, the carrier phase and the carrier
The True CramerRao Bound For Carrier And Symbol Synchronization
"... This contribution considers the CramerRao bound (CRB) related to estimating the synchronization parameters (carrier phase, carrier frequency and time delay) of a noisy linearly modulated signal with random data symbols. We explore various scenarios, involving the estimation of a subset of the param ..."
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Cited by 1 (1 self)
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This contribution considers the CramerRao bound (CRB) related to estimating the synchronization parameters (carrier phase, carrier frequency and time delay) of a noisy linearly modulated signal with random data symbols. We explore various scenarios, involving the estimation of a subset
On the CramerRao bound for carrier frequency estimation in the presence of phase noise
, 2007
"... We consider the carrier frequency offset estimation in a digital burstmode satellite transmission affected by phase noise. The corresponding CramerRao lower bound is analyzed for linear modulations under a Wiener phase noise model and in the hypothesis of knowledge of the transmitted data. Even i ..."
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Cited by 5 (4 self)
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We consider the carrier frequency offset estimation in a digital burstmode satellite transmission affected by phase noise. The corresponding CramerRao lower bound is analyzed for linear modulations under a Wiener phase noise model and in the hypothesis of knowledge of the transmitted data. Even
The Impact of the Observation Model on the CramerRao Bound for Carrier and Frequency
 Synchronization”, in Proc. IEEE Int. Conf. Communications 2003
, 2003
"... Abstract — This contribution considers the CramerRao bound (CRB) related to the joint estimation of the carrier phase and frequency of a noisy linearly modulated signal with random data symbols, using the correct continuoustime model of the received signal. We compare our results with the existing ..."
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Cited by 2 (2 self)
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Abstract — This contribution considers the CramerRao bound (CRB) related to the joint estimation of the carrier phase and frequency of a noisy linearly modulated signal with random data symbols, using the correct continuoustime model of the received signal. We compare our results
Standard CramerRao bound CramerRao bound with nuisance parameter Bayesian CramerRao bound Other bounds
"... We assume y(n) = a(n)e2ipif0n + b(n), n = 0,...,N − 1 with y(n) : the received signal a(n) : a zeromean random process or a timevarying amplitude. b(n) : circular white Gaussian stationary additive noise. Goal: Estimating the frequency f0 in multiplicative and additive noise ..."
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We assume y(n) = a(n)e2ipif0n + b(n), n = 0,...,N − 1 with y(n) : the received signal a(n) : a zeromean random process or a timevarying amplitude. b(n) : circular white Gaussian stationary additive noise. Goal: Estimating the frequency f0 in multiplicative and additive noise
The true CramerRao bound for phaseindependent Carrier Frequency Estimation from a . . .
 IN PROC. IEEE GLOBECOM
, 2002
"... This contribution considers the CramerRao bound (CRB) related to phaseindependent carrier frequency estimation from a noisy PSK signal. Instead of estimating the frequency jointly with the carrier phase, we treat the phase as a nuisance parameter. Ideal symbol timing is assumed. Both cases of kn ..."
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Cited by 6 (5 self)
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This contribution considers the CramerRao bound (CRB) related to phaseindependent carrier frequency estimation from a noisy PSK signal. Instead of estimating the frequency jointly with the carrier phase, we treat the phase as a nuisance parameter. Ideal symbol timing is assumed. Both cases
PILOTSYMBOL ASSISTED CARRIER SYNCHRONIZATION: CRAMERRAO BOUND AND SYNCHRONIZER PERFORMANCE
"... Abstract This contribution considers the joint estimation of the carrier phase and the frequency offset from a noisy linearly modulated burst signal containing random data symbols (DS) as well as known pilot symbols (PS). The corresponding CramerRao lower bound (CRB) is derived. This bound indicat ..."
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Abstract This contribution considers the joint estimation of the carrier phase and the frequency offset from a noisy linearly modulated burst signal containing random data symbols (DS) as well as known pilot symbols (PS). The corresponding CramerRao lower bound (CRB) is derived. This bound
The true CramerRao bound for estimating the time delay of a linearly modulated waveform
"... In this contribution we consider the CramerRao bound (CRB) for the estimation of the time delay of a noisy linearly modulated signal with random data symbols. In spite of the presence of the nuisance parameters (i.e., the random data symbols), we obtain a closedform expression of this CRB for arbi ..."
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Cited by 1 (0 self)
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In this contribution we consider the CramerRao bound (CRB) for the estimation of the time delay of a noisy linearly modulated signal with random data symbols. In spite of the presence of the nuisance parameters (i.e., the random data symbols), we obtain a closedform expression of this CRB
Posterior CramérRao bounds for discretetime nonlinear filtering
 IEEE Trans. Signal Processing
, 1998
"... Abstract—A meansquare error lower bound for the discretetime nonlinear filtering problem is derived based on the Van Trees (posterior) version of the Cramér–Rao inequality. This lower bound is applicable to multidimensional nonlinear, possibly nonGaussian, dynamical systems and is more general tha ..."
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Cited by 178 (4 self)
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Abstract—A meansquare error lower bound for the discretetime nonlinear filtering problem is derived based on the Van Trees (posterior) version of the Cramér–Rao inequality. This lower bound is applicable to multidimensional nonlinear, possibly nonGaussian, dynamical systems and is more general
Results 1  10
of
1,071,372