In this paper, a noniterative linear least-squares error method developed b
y Yang and Chen for solving the inverse problems is re-examined. For the me
thod, condition for the existence of a unique solution and the error bound
of the resulting inverse solution considering the measurement errors are de
rived. Though the method was shown to be able to give the unique inverse so
lution at only one iteration in the literature, however. it is pointed out
with two examples that for some inverse problems the method is practically
not applicable. once the unavoidable measurement errors are included. The r
eason behind this is that the so-called reverse matrix for these inverse pr
oblems has a huge number of 1-norm, thus, magnifying a small measurement er
ror to an extent that is unacceptable for the resulting inverse solution in
a practical sense. In other words, the method fails to yield a reasonable
solution whenever applied to an ill-conditioned inverse problem. In such a
case, two approaches are recommended for decreasing the very high condition
number: (i) by increasing the number of measurements or taking measurement
s as close as possible to the location at which the to-be-estimated unknown
condition is applied. and (ii) by using the singular value decomposition (
SVD). (C) 2001 Elsevier Science Inc. All rights reserved.