Control Theory and Optimization I
Par :Formats :
- Nombre de pages284
- PrésentationRelié
- Poids0.485 kg
- Dimensions16,2 cm × 24,1 cm × 2,0 cm
- ISBN3-540-66741-5
- EAN9783540667414
- Date de parution25/04/2000
- CollectionEncyclopaedia of mathematical
- ÉditeurSpringer
Résumé
This book is devoted to geometric methods in the theory of differential equations with quadratic right-hand sides (Riccati-type equations), which are closely related to the calculus of variations and optimal control theory. Connections of the calculus of variations and the Riccati equation with the geometry of Lagrange-Grassmann manifolds and classical Cartan-Siegel homogeneity domains in a space of several complex variables are considered. In the study of the minimization problem for a multiple integral, a quadratic partial differential equation that is an analogue of the Riccati equation in the calculus of variations is studied. This book is based on lectures given by the author over a period of several year's in the Department of Mechanics and Mathematics of Moscow State University. The book is addressed to, under-
graduate and graduate students, scientific researchers and all specialists interested in the problems of geometry, the calculus of variations, and differential equations.
This book is devoted to geometric methods in the theory of differential equations with quadratic right-hand sides (Riccati-type equations), which are closely related to the calculus of variations and optimal control theory. Connections of the calculus of variations and the Riccati equation with the geometry of Lagrange-Grassmann manifolds and classical Cartan-Siegel homogeneity domains in a space of several complex variables are considered. In the study of the minimization problem for a multiple integral, a quadratic partial differential equation that is an analogue of the Riccati equation in the calculus of variations is studied. This book is based on lectures given by the author over a period of several year's in the Department of Mechanics and Mathematics of Moscow State University. The book is addressed to, under-
graduate and graduate students, scientific researchers and all specialists interested in the problems of geometry, the calculus of variations, and differential equations.