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The cross-correlation matrix of two random vectors is a matrix containing as elements the cross-correlations of all pairs of elements of the random vectors. The cross-correlation matrix is used in various digital signal processing algorithms.
Definition
For two random vectors and , each containing random elements whose expected value and variance exist, the cross-correlation matrix of and is defined by[1]: p.337
and has dimensions . Written component-wise:
The random vectors and need not have the same dimension, and either might be a scalar value.
Example
For example, if and are random vectors, then is a matrix whose -th entry is .
Complex random vectors
If and are complex random vectors, each containing random variables whose expected value and variance exist, the cross-correlation matrix of and is defined by
where denotes Hermitian transposition.
Uncorrelatedness
Two random vectors and are called uncorrelated if
They are uncorrelated if and only if their cross-covariance matrix matrix is zero.
In the case of two complex random vectors and they are called uncorrelated if
and
Properties
Relation to the cross-covariance matrix
The cross-correlation is related to the cross-covariance matrix as follows:
- Respectively for complex random vectors:
See also
- Autocorrelation
- Correlation does not imply causation
- Covariance function
- Pearson product-moment correlation coefficient
- Correlation function (astronomy)
- Correlation function (statistical mechanics)
- Correlation function (quantum field theory)
- Mutual information
- Rate distortion theory
- Radial distribution function
References
Further reading
- Hayes, Monson H., Statistical Digital Signal Processing and Modeling, John Wiley & Sons, Inc., 1996. ISBN 0-471-59431-8.
- Solomon W. Golomb, and Guang Gong. Signal design for good correlation: for wireless communication, cryptography, and radar. Cambridge University Press, 2005.
- M. Soltanalian. Signal Design for Active Sensing and Communications. Uppsala Dissertations from the Faculty of Science and Technology (printed by Elanders Sverige AB), 2014.