Explore: Calculus Of Variations And Optimal Control
Discover books, insights, and more — all in one place.
Learn more about Calculus Of Variations And Optimal Control with top reads curated from trusted sources — all in one place.
AI-Generated Overview About “calculus-of-variations-and-optimal-control”:
Books Results
Source: The Open Library
The Open Library Search Results
Search results from The Open Library
1Variational Principles in Physics
By Jean-Louis Basdevant
“Variational Principles in Physics” Metadata:
- Title: ➤ Variational Principles in Physics
- Author: Jean-Louis Basdevant
- Language: English
- Number of Pages: Median: 184
- Publisher: ➤ Springer International Publishing AG - Springer London, Limited - Springer
- Publish Date: ➤ 2006 - 2007 - 2010 - 2023 - 2024
“Variational Principles in Physics” Subjects and Themes:
- Subjects: ➤ Variational principles - Analytic Mechanics - Lagrange equations - Field theory (Physics) - Hamilton-Jacobi equations - Mathematical physics - Dynamics - Mechanics, analytic - Calculus of variations - Mathematical optimization - Mechanics, applied - Mechanics - Physics - History of Physics - History - Calculus of Variations and Optimal Control - Mathematical Methods in Physics - Optimization - Theoretical and Applied Mechanics - Applied Mechanics
Edition Identifiers:
- The Open Library ID: OL51040791M - OL40323211M - OL34456764M - OL28290827M - OL7445734M
- Online Computer Library Center (OCLC) ID: 80185801
- Library of Congress Control Number (LCCN): 2006931784
- All ISBNs: ➤ 9781441922793 - 9780387377476 - 0387377476 - 9783031216947 - 3031216911 - 9783031216916 - 0387377484 - 1441922792 - 3031216946 - 9780387377483
Access and General Info:
- First Year Published: 2006
- Is Full Text Available: Yes
- Is The Book Public: No
- Access Status: Borrowable
Online Access
Downloads Are Not Available:
The book is not public therefore the download links will not allow the download of the entire book, however, borrowing the book online is available.
Online Borrowing:
- Borrowing from Open Library: Borrowing link
- Borrowing from Archive.org: Borrowing link
Online Marketplaces
Find Variational Principles in Physics at online marketplaces:
- Amazon: Audiable, Kindle and printed editions.
- Ebay: New & used books.
Wiki
Source: Wikipedia
Wikipedia Results
Search Results from Wikipedia
Optimal control
problems within the framework of optimal control theory. Optimal control is an extension of the calculus of variations, and is a mathematical optimization
List of theorems
theorem (calculus of variations) Isoperimetric theorem (curves, calculus of variations) Minimax theorem (game theory) Mountain pass theorem (calculus of variations)
Brachistochrone curve
tools from the calculus of variations and optimal control. The curve is independent of both the mass of the test body and the local strength of gravity. Only
Calculus of variations
calculus of variations (or variational calculus) is a field of mathematical analysis that uses variations, which are small changes in functions and functionals
Fundamental lemma of the calculus of variations
In mathematics, specifically in the calculus of variations, a variation δf of a function f can be concentrated on an arbitrarily small interval, but not
Contrôle Optimisation et Calcul des Variations
articles on control theory, optimization, optimal control and calculus of variations. "ESAIM: Control, Optimisation and Calculus of Variations (ESAIM: COCV)"
Bellman equation
Nancy L. (1991). Dynamic Optimization: The Calculus of Variations and Optimal Control in Economics and Management (Second ed.). Amsterdam: Elsevier
Magnus Hestenes
American mathematician best known for his contributions to calculus of variations and optimal control. As a pioneer in computer science, he devised the conjugate
Lagrange multiplier
Schwartz, N. L. (1991). Dynamic Optimization: The Calculus of Variations and Optimal Control in Economics and Management (Second ed.). New York: Elsevier.
Product (mathematics)
2020-08-16. Clarke, Francis (2013). Functional analysis, calculus of variations and optimal control. Dordrecht: Springer. pp. 9–10. ISBN 978-1447148203. Boothby