On the generalized least squares method. Counter-examples to general convergence

## ON THE CONVERGENCE OF THE GENERALIZED MATRIX MULTISPLITTING RELAXED METHODS '2k(R1,\*1, QJ = (D -R ~E , -\*P,)-'[(I -Q1)D + (Q1-R J E ~ + ( a 1 -\*AF, 9LR2, + Q l h + Hk + W,)l (4) 0 2 ) = (D -R2,4 -\*2Hk>-'[(I -Qz)D + (Q, -Rz)p, + (Q, -\*JH,

We examined the power of the stepwise iterated generalized least squares (GLS) method by modeling the relationship between quantitative traits and other variables using the simulated data for Problem 2A. The comparison between the generating model provided by the workshop and the results of the step

## Abstract General stationary iterative methods with a singular matrix __M__ for solving range‐Hermitian singular linear systems are presented, some convergence conditions and the representation of the solution are also given. It can be verified that the general Ortega–Plemmons theorem and Keller