The Bayesian ideal observer sets an upper bound for diagnostic performance of an imaging system in binary
detection tasks. Thus, this observer should be used for image quality assessment whenever possible. However, it
is difficult to compute ideal-observer performance because the probability density functions of the data, required
for the observer, are often unknown in tasks involving complex backgrounds. Furthermore, the dimension of
the integrals that need to be calculated for the observer is huge. To attempt to reduce the dimensionality
of the problem, and yet still approximate ideal-observer performance, a channelized-ideal observer (CIO) with
Laguerre-Gauss channels was previously investigated for detecting a Gaussian signal at a known location in
non-Gaussian lumpy images. While the CIO with Laguerre-Gauss channels had, in some cases, approximated
ideal-observer performance, there was still a gap between the mean performance of the ideal observer and the
CIO. Moreover, it is not clear how to choose efficient channels for the ideal observer. In the current work, we
investigate the use of singular vectors of a linear imaging system as efficient channels for the ideal observer in
the same tasks. Singular value decomposition of the imaging system is performed to obtain its singular vectors.
Singular vectors most relevant to the signal and background images are chosen as candidate channels. Results
indicate that the singular vectors are not only more efficient than Laguerre-Gauss channels, but are also highly
efficient for the ideal observer. The results further demonstrate that singular vectors strongly associated with
the signal-only image are the most efficient channels.