-
David Gilbert Luenberger (born
September 16, 1937) is a
mathematical scientist known for his
research and his textbooks,
which center on
mathematical optimization...
- For a
Luenberger observer, the
observer error satisfies e ( k + 1 ) = ( A − L C ) e ( k ) {\displaystyle e(k+1)=(A-LC)e(k)} . The
Luenberger observer...
- Interior-Point Algorithms:
Theory and Analysis. He
joined David Luenberger for the
third edition of
Luenberger's Linear and
Nonlinear Programming. In
recent years,...
- Convexity.
World Scientific Publishing.
Luenberger,
David (1984).
Linear and
Nonlinear Programming. Addison-Wesley.
Luenberger,
David (1969).
Optimization by Vector...
-
optimal control and
shape optimization. Semi-infinite
programming David Luenberger (1997).
Optimization by
Vector Space Methods. John
Wiley & Sons. ISBN 0-471-18117-X...
-
order necessary optimality condition,
initially investigated by
Meier and
Luenberger in 1967. The
first convergence proof of IRKA was
given by Flagg, Beattie...
- more
uneven than the input. More
general state observers, such as the
Luenberger observer for
linear control systems, use a
rigorous system model. Linear...
-
presentations of
mathematical dynamic system theory include Beltrami (1998),
Luenberger (1979),
Padulo &
Arbib (1974), and
Strogatz (1994). The
dynamical system...
- (Second ed.). London: North-Holland. pp. 126–27. ISBN 0-444-01609-0.
Luenberger,
David G. (1969).
Optimization by
Vector Space Methods. New York: John...
- "Perpetuity". Investopedia. 24
November 2003.
Retrieved 26 May 2016.
Luenberger,
David (2009).
Investment Science. New York City:
Oxford University Press...
