This paper considers two completion problems on block matrices with maximal
and minimal ranks: Let A = (A(ij)) be an n x n block matrix, where A(ij) (
n greater than or equal to i greater than or equal to j greater than or equ
al to 1) is given, and A(ij) (1 less than or equal to i less than or equal
to j less than or equal to n) is a variant block entry. Then determine all
these variant block entries such that A = (A(ij)) has maximal and minimal p
ossible ranks, respectively. By making use of the theory of generalized inv
erses of matrices, we present complete solutions to these two problems. As
applications, we also determine maximal and minimal ranks of the matrix exp
ression A - BXC when X is a variant triangular block matrix, and then prese
nt a necessary and sufficient condition for the matrix equation BXC = A to
have a triangular block solution. (C) 2000 Elsevier Science Inc. All rights
reserved. AMS classification: 15A03; 15A09; 15A24.