MAKurt: multivariate kurtosis in the sense of Malkovich and Afifi

value of sample kurtosis in the sense of Malkovich and Afifi.

Multivariate sample skewness due to Malkovich and Afifi (1973) is defined by $$b_{n,d,M}^{(1)}=\max_{u\in \{x\in\mathbf{R}^d:\|x\|=1\}}\frac{\left(\frac{1}{n}\sum_{j=1}^n(u^\top X_j-u^\top \overline{X}_n )^3\right)^2}{(u^\top S_n u)^3},$$ where \(\overline{X}_n\) is the sample mean and \(S_n\) is the sample covariance matrix of the random vectors \(X_1,\ldots,X_n\). To ensure that the computation works properly \(n \ge d+1\) is needed. If that is not the case the function returns an error.