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A Unifying Modeling Abstraction for Infinite-Dimensional Optimization
Computers & Chemical Engineering
◽
10.1016/j.compchemeng.2021.107567
◽
2021
◽
pp. 107567
Author(s):
Joshua L. Pulsipher
◽
Weiqi Zhang
◽
Tyler J. Hongisto
◽
Victor M. Zavala
Keyword(s):
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
Download Full-text
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References
Infinite Dimensional Optimization Models and PDEs for Dejittering
Lecture Notes in Computer Science - Scale Space and Variational Methods in Computer Vision
◽
10.1007/978-3-319-18461-6_54
◽
2015
◽
pp. 678-689
◽
Cited By ~ 3
Author(s):
Guozhi Dong
◽
Aniello Raffaele Patrone
◽
Otmar Scherzer
◽
Ozan Öktem
Keyword(s):
Optimization Models
◽
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
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Solving Infinite-dimensional Optimization Problems by Polynomial Approximation
Recent Advances in Optimization and its Applications in Engineering
◽
10.1007/978-3-642-12598-0_3
◽
2010
◽
pp. 31-40
◽
Cited By ~ 9
Author(s):
Olivier Devolder
◽
François Glineur
◽
Yurii Nesterov
Keyword(s):
Polynomial Approximation
◽
Optimization Problems
◽
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
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Duality Bounds in Robustness Analysis**The original version of this paper was presented at the 13th IFAC World Congress, which was held in San Francisco, U.S.A., during June 30 – July 5, 1996. The published proceedings of this IFAC meeting may be ordered from: Elsevier Science Limited, The Boulevard, Langford Lane, Kidlington, Oxford OX5 1GB, UK. This paper was recommended for publication in revised form by Associate Editor Roberto Tempo under the direction of Editor Ruth. F. Curtain,11Duality theory is used to obtain bounds for an important class of infinite-dimensional optimization problems in robustness analysis.
Automatica
◽
10.1016/s0005-1098(97)00102-7
◽
1997
◽
Vol 33
(10)
◽
pp. 1835-1844
◽
Cited By ~ 10
Author(s):
ULF JÖNSSON
◽
ANDERS RANTZER
Keyword(s):
San Francisco
◽
Optimization Problems
◽
Robustness Analysis
◽
Associate Editor
◽
Original Version
◽
Important Class
◽
World Congress
◽
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
Download Full-text
Duality and optimality conditions for infinite dimensional optimization problems
System Modelling and Optimization - Lecture Notes in Control and Information Sciences
◽
10.1007/bfb0035491
◽
1994
◽
pp. 423-436
◽
Cited By ~ 1
Author(s):
Armin Hoffmann
Keyword(s):
Optimality Conditions
◽
Optimization Problems
◽
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
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A generalization of multiplier rules for infinite-dimensional optimization problems
Optimization
◽
10.1080/02331934.2020.1755863
◽
2020
◽
pp. 1-11
Author(s):
Hasan Yilmaz
Keyword(s):
Optimization Problems
◽
Infinite Dimensional
◽
Multiplier Rules
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
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Infinite Dimensional Optimization and Control Theory
10.1017/cbo9780511574795
◽
1999
◽
Cited By ~ 164
Author(s):
Hector O. Fattorini
Keyword(s):
Control Theory
◽
Infinite Dimensional
◽
Optimization And Control
◽
And Control
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
Download Full-text
Infinite Dimensional Optimization
Modern Control Engineering
◽
10.1016/b978-0-08-016820-3.50007-2
◽
1972
◽
pp. 82-145
Author(s):
Maxwell Noton
Keyword(s):
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
Download Full-text
Deformation method for the investigation of infinite-dimensional optimization problems
Mathematical Notes
◽
10.1007/bf01208334
◽
1993
◽
Vol 53
(2)
◽
pp. 240-241
Author(s):
V. I. Skalyga
Keyword(s):
Optimization Problems
◽
Deformation Method
◽
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
Download Full-text
The lagrange-newton method for infinite-dimensional optimization problems
Numerical Functional Analysis and Optimization
◽
10.1080/01630569008816371
◽
1990
◽
Vol 11
(3-4)
◽
pp. 201-224
◽
Cited By ~ 38
Author(s):
Walter Alt
Keyword(s):
Newton Method
◽
Optimization Problems
◽
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
Download Full-text
Infinite Penalization for Optimal Control Problems: An infinite-dimensional optimization method for constrained optimization problems
PAMM
◽
10.1002/pamm.201310274
◽
2013
◽
Vol 13
(1)
◽
pp. 587-588
◽
Cited By ~ 1
Author(s):
Martin Gugat
◽
Michael Herty
Keyword(s):
Optimal Control
◽
Constrained Optimization
◽
Optimal Control Problems
◽
Optimization Problems
◽
Optimization Method
◽
Control Problems
◽
Constrained Optimization Problems
◽
Infinite Dimensional
◽
Dimensional Optimization
◽
Infinite Dimensional Optimization
Download Full-text
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