Search results for "Complex normal distribution"

showing 3 items of 3 documents

Parameter optimization for amplify-and-forward relaying with imperfect channel estimation

2009

Cooperative diversity is a promising technology for future wireless networks. In this paper, we consider a cooperative communication system operating in an amplify-and-forward (AF) mode with an imperfectly-known relay fading channel. It is assumed that a pilot symbol assisted modulation (PSAM) scheme with linear minimum mean square estimator (LMMSE) is used for the channel estimation. A simple and easy-to-evaluate asymptotical upper bound (AUB) of the symbol-error-rate (SER) is derived for uncoded AF cooperative systems with quadrature amplitude modulation (QAM) constellations. Based on the AUB, we propose a criterion for the choice of parameters in the PSAM scheme, i.e., the pilot spacing …

Mean squared errorChannel state informationControl theoryVDP::Technology: 500::Information and communication technology: 550::Telecommunication: 552EstimatorFadingUpper and lower boundsAlgorithmQuadrature amplitude modulationComplex normal distributionCooperative diversityMathematics
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A Highly Flexible Trajectory Model Based on the Primitives of Brownian Fields—Part II: Analysis of the Statistical Properties

2016

In the first part of our paper, we have proposed a highly flexible trajectory model based on the primitives of Brownian fields (BFs). In this second part, we study the statistical properties of that trajectory model in depth. These properties include the autocorrelation function (ACF), mean, and the variance of the path along each axis. We also derive the distribution of the angle-of-motion (AOM) process, the incremental traveling length process, and the overall traveling length. It is shown that the path process is in general non-stationary. We show that the AOM and the incremental traveling length processes can be modeled by the phase and the envelope of a complex Gaussian process with no…

Mathematical optimizationUniform distribution (continuous)Applied MathematicsGaussianAutocorrelationMathematical analysis020206 networking & telecommunications020302 automobile design & engineering02 engineering and technologyComputer Science ApplicationsComplex normal distributionsymbols.namesake0203 mechanical engineeringLog-normal distribution0202 electrical engineering electronic engineering information engineeringsymbolsTrajectoryElectrical and Electronic EngineeringGaussian processRandom variableMathematicsIEEE Transactions on Wireless Communications
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Toeplitz band matrices with small random perturbations

2021

We study the spectra of $N\times N$ Toeplitz band matrices perturbed by small complex Gaussian random matrices, in the regime $N\gg 1$. We prove a probabilistic Weyl law, which provides an precise asymptotic formula for the number of eigenvalues in certain domains, which may depend on $N$, with probability sub-exponentially (in $N$) close to $1$. We show that most eigenvalues of the perturbed Toeplitz matrix are at a distance of at most $\mathcal{O}(N^{-1+\varepsilon})$, for all $\varepsilon >0$, to the curve in the complex plane given by the symbol of the unperturbed Toeplitz matrix.

Pure mathematicsSpectral theoryGeneral Mathematics010103 numerical & computational mathematics01 natural sciencesMathematics - Spectral TheoryMathematics - Analysis of PDEsFOS: MathematicsAsymptotic formula0101 mathematicsSpectral Theory (math.SP)Eigenvalues and eigenvectorsMathematics010102 general mathematicsProbability (math.PR)Toeplitz matrixComplex normal distribution[MATH.MATH-PR]Mathematics [math]/Probability [math.PR]Weyl lawRandom perturbationsRandom matrixComplex planeSpectral theoryMathematics - ProbabilityNon-self-adjoint operators[MATH.MATH-SP]Mathematics [math]/Spectral Theory [math.SP]Analysis of PDEs (math.AP)
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