Abstract
The Macro Basis Function (MBF) approach and the Full Orthogonalization Method (FOM), a Krylov-subspace iterative solution, are compared from two points of view: the subtented subspaces and the imposed orthogonality conditions. Examples are shown for the case of small arrays made of complex elements. Possible strategies for the reduction of the total number of multiple-scattering MBFs are briefly mentioned.
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