We apply this result to obtain a new approach for solving the
symmetric indefinite systems
arising in interior-point methods for linear and quadratic programming.
These systems are typically solved either by reducing to a
positive definite
system or by performing a Bunch-Parlett factorization of the full
indefinite system at every iteration.
Ours is an intermediate approach based on reducing to a
quasi-definite system.
This approach entails less fill-in than further reducing to a
positive definite system but is based on a static ordering and
is therefore more
efficient than performing Bunch-Parlett factorizations of the original
indefinite system.
Paper available at:
ftp://dimacs.rutgers.edu/pub/dimacs/TechnicalReports/TechReports/1993/93-72.ps
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