The complex multinormal distribution, quadratic forms in complex random vectors and an omnibus goodness-of-fit test for the complex normal distribution

This paper first reviews some basic properties of the (noncircular) complex multinormal distribution and presents a few characterizations of it. The distribution of linear combinations of complex normally distributed random vectors is then obtained, as well as the behavior of quadratic forms in complex multinormal random vectors. We look into the problem of estimating the complex parameters of the complex normal distribution and give their asymptotic distribution. We then propose a virtually omnibus goodness-of-fit test for the complex normal distribution with unknown parameters, based on the empirical characteristic function. Monte Carlo simulation results show that our test behaves well against various alternative distributions. The test is then applied to an fMRI data set and we show how it can be used to “validate” the usual hypothesis of normality of the outside-brain signal. An R package that contains the functions to perform the test is available from the authors.

[1]  G. Turin The characteristic function of Hermitian quadratic forms in complex normal variables , 1960 .

[2]  Daniel B. Rowe,et al.  A complex way to compute fMRI activation , 2004, NeuroImage.

[3]  J. D’hooge,et al.  Statistics of the radio-frequency signal based on K distribution with application to echocardiography , 2006, IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control.

[4]  Daniel González-Jiménez,et al.  Shape-Driven Gabor Jets for Face Description and Authentication , 2007, IEEE Transactions on Information Forensics and Security.

[5]  N. R. Goodman Statistical analysis based on a certain multivariate complex Gaussian distribution , 1963 .

[6]  Tülay Adali,et al.  Complex-Valued Signal Processing: The Proper Way to Deal With Impropriety , 2011, IEEE Transactions on Signal Processing.

[7]  V D Calhoun,et al.  Independent component analysis of fMRI data in the complex domain , 2002, Magnetic resonance in medicine.

[8]  Daniel J. Mundfrom,et al.  A Monte Carlo comparison of the Type I and Type II error rates of tests of multivariate normality , 2005 .

[9]  M. Kupperman Linear Statistical Inference and Its Applications 2nd Edition (C. Radhakrishna Rao) , 1975 .

[10]  D L Streiner,et al.  An Introduction to Multivariate Statistics , 1993, Canadian journal of psychiatry. Revue canadienne de psychiatrie.

[11]  Adriaan van den Bos,et al.  The multivariate complex normal distribution-a generalization , 1995, IEEE Trans. Inf. Theory.

[12]  R. Wooding The multivariate distribution of complex normal variables , 1956 .

[13]  Simon Haykin,et al.  Robust Estimation Techniques for ComplexValued Random Vectors , 2010 .

[14]  A short proof of the levy continuity theorem in Hilbert space , 1965 .

[15]  S. Csőrgő Limit Behaviour of the Empirical Characteristic Function , 1981 .

[16]  Tülay Adali,et al.  A Complex Generalized Gaussian Distribution— Characterization, Generation, and Estimation , 2010, IEEE Transactions on Signal Processing.

[17]  M. Bilodeau,et al.  Theory of multivariate statistics , 1999 .

[18]  Malene Højbjerre,et al.  Linear and Graphical Models , 1995 .

[19]  G. Casella,et al.  Springer Texts in Statistics , 2016 .

[20]  Malene Højbjerre,et al.  Lecture Notes in Statistics 101: Linear and Graphical Models for the Multivariate Complex Normal Distribution , 1995 .

[21]  Malene Højbjerre,et al.  The Multivariate Complex Normal Distribution , 1995 .

[22]  P. Rousseeuw,et al.  Wiley Series in Probability and Mathematical Statistics , 2005 .

[23]  R. Penrose A Generalized inverse for matrices , 1955 .

[24]  Visa Koivunen,et al.  Essential Statistics and Tools for Complex Random Variables , 2010, IEEE Transactions on Signal Processing.

[25]  Norbert Henze,et al.  Invariant tests for multivariate normality: a critical review , 2002 .

[26]  V. Calhoun,et al.  Analysis of complex-valued functional magnetic resonance imaging data: are we just going through a "phase"? , 2012 .

[27]  S. R. Searle Linear Models , 1971 .

[28]  Bernard C. Picinbono,et al.  Second-order complex random vectors and normal distributions , 1996, IEEE Trans. Signal Process..

[29]  Calyampudi Radhakrishna Rao,et al.  Linear Statistical Inference and its Applications , 1967 .