# ecmnstd

Standard errors for mean and covariance of incomplete data

## Syntax

[StdMean, StdCovariance] = ecmnstd(Data, Mean, Covariance, Method)

## Arguments

 Data NUMSAMPLES-by-NUMSERIES matrix with NUMSAMPLES samples of a NUMSERIES-dimensional random vector. Missing values are indicated by NaNs. Mean NUMSERIES-by-1 column vector of maximum-likelihood parameter estimates for the mean of Data using the expectation conditional maximization (ECM) algorithm Covariance NUMSERIES-by-NUMSERIES matrix of maximum-likelihood covariance estimates for the covariance of Data using the ECM algorithm Method (Optional) String indicating method of estimation for standard error calculations. The methods are:hessian — (Default) Hessian of the observed negative log-likelihood function. fisher — Fisher information matrix.

## Description

[StdMean, StdCovariance] = ecmnstd(Data, Mean, Covariance, Method) computes standard errors for mean and covariance of incomplete data.

StdMean is a NUMSERIES-by-1 column vector of standard errors of estimates for each element of the mean vector Mean.

StdCovariance is a NUMSERIES-by-NUMSERIES matrix of standard errors of estimates for each element of the covariance matrix Covariance.

Use this routine after estimating the mean and covariance of Data with ecmnmle. If the mean and distinct covariance elements are treated as the parameter θ in a complete-data maximum-likelihood estimation, then as the number of samples increases, θ attains asymptotic normality such that

$\theta -E\left[\theta \right]\sim N\left(0,{I}^{-1}\left(\theta \right)\right),$

where E[θ] is the mean and I(θ) is the Fisher information matrix.

With missing data, the Hessian H(θ) is a good approximation for the Fisher information (which can only be approximated when data is missing).

It is usually advisable to use the default Method since the resultant standard errors incorporate the increased uncertainty due to missing data. In particular, standard errors calculated with the Hessian are generally larger than standard errors calculated with the Fisher information matrix.

 Note   This routine is very slow for NUMSERIES > 10 or NUMSAMPLES > 1000.