Journal of Computational and Applied Mathematics vol:10 pages:329-354
A set of formulas is given for the relations that exist between the first and last block now or column of the inverse of a block Hankel or Toeplitz matrix. This is related to making arbitrary steps in a matrix Padé table.
The recursive relations given in Part I of this report can be interpreted as recursions for the denominators of matrix Padé approximants. In this part we shall give dual relations for the corresponding numerators and residuals.