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✦   LIBER   ✦

Semiconcave functions, Hamilton-Jacobi equations, and optimal control

✍ Scribed by Piermarco Cannarsa, Carlo Sinestrari

Book ID
127418537
Publisher
Birkhäuser Boston
Year
2004
Tongue
English
Weight
1 MB
Series
Progress in Nonlinear Differential Equations and Their Applications
Edition
1
Category
Library
ISBN
0817643362

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✦ Synopsis

Semiconcavity is a natural generalization of concavity that retains most of the good properties known in convex analysis, but arises in a wider range of applications. This text is the first comprehensive exposition of the theory of semiconcave functions, and of the role they play in optimal control and Hamilton-Jacobi equations.

The first part covers the general theory, encompassing all key results and illustrating them with significant examples. The latter part is devoted to applications concerning the Bolza problem in the calculus of variations and optimal exit time problems for nonlinear control systems. The exposition is essentially self-contained since the book includes all prerequisites from convex analysis, nonsmooth analysis, and viscosity solutions.

📜 SIMILAR VOLUMES

Semiconcave Functions, Hamilton-Jacobi E
Semiconcave Functions, Hamilton-Jacobi Equations, and Optimal Control
✍ Cannarsa P., Sinestrari C. 📂 Library 📅 2004 🌐 English ⚖ 445 KB

This text details the theory of semiconcave functions and describes the role they play in optimal control and Hamilton-Jacobi equations. Part I covers the general theory, summarizing and illustrating key results with significant examples. Part II is devoted to applications concerning the Bolza probl

Semiconcave Functions, Hamilton—Jacobi E
Semiconcave Functions, Hamilton—Jacobi Equations, and Optimal Control
✍ Piermarco Cannarsa, Carlo Sinestrari (auth.) 📂 Library 📅 2004 🏛 Birkhäuser 🌐 English ⚖ 2 MB

Semiconcavity is a natural generalization of concavity that retains most of the good properties known in convex analysis, but arises in a wider range of applications. This text is the first comprehensive exposition of the theory of semiconcave functions, and of the role they play in optimal control