Stochastic control and mathematical modeling : applications in economics
著者
書誌事項
Stochastic control and mathematical modeling : applications in economics
(Encyclopedia of mathematics and its applications / edited by G.-C. Rota, [131])
Cambridge University Press, 2010
- : hbk
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注記
Includes bibliographical references (p. 317-322) and index
Summary: "This is a concise and elementary introduction to stochastic control and mathematical modeling. This book is designed for researchers in stochastic control theory studying its application in mathematical economics and those in economics who are interested in mathematical theory in control. It is also a good guide for graduate students studying applied mathematics, mathematical economics, and non-linear PDE theory. Contents include the basics of analysis and probability, the theory of stochastic differential equations, variational problems, problems in optimal consumption and in optimal stopping, optimal pollution control, and solving the HJB equation with boundary conditions. Major mathematical requisitions are contained in the preliminary chapters or in the appendix so that readers can proceed without referring to other materials"--Provided by publisher
内容説明・目次
内容説明
目次
- Part I. Stochastic Calculus and Optimal Control Theory: 1. Foundations of stochastic calculus
- 2. Stochastic differential equations: weak formulation
- 3. Dynamic programming
- 4. Viscosity solutions of Hamilton-Jacobi-Bellman equations
- 5. Classical solutions of Hamilton-Jacobi-Bellman equations
- Part II. Applications to Mathematical Models in Economics: 6. Production planning and inventory
- 7. Optimal consumption/investment models
- 8. Optimal exploitation of renewable resources
- 9. Optimal consumption models in economic growth
- 10. Optimal pollution control with long-run average criteria
- 11. Optimal stopping problems
- 12. Investment and exit decisions
- Part III. Appendices: A. Dini's theorem
- B. The Stone-Weierstrass theorem
- C. The Riesz representation theorem
- D. Rademacher's theorem
- E. Vitali's covering theorem
- F. The area formula
- G. The Brouwer fixed point theorem
- H. The Ascoli-Arzela theorem.
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