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Bibliography

Monography Chapter

Riccati Equations and their Solution

Kučera Vladimír

: The Control Handbook, Second Edition: Control System Advanced Methods, p. 14.1-14.21 , Eds: Lewine Wilian S.

: CEZ:AV0Z10750506

: 1M0567, GA MŠk

: Riccati equation, optimal control, solution

: http://library.utia.cas.cz/separaty/2011/TR/kucera-0436431.pdf

(eng): A Riccati equation, deriving its name from Jacopo Francesco, Count Riccati (1676–1754) [1], who studied a particular case of this equation from 1719 to 1724. For several reasons, a differential equation of the form of Equation 14.1, and generalizations thereof comprise a highly significant class of nonlinear ordinary differential equations. First, they are intimately related to ordinary linear homogeneous differential equations of the second order. Second, the solutions of Equation 14.1 possess a very particular structure in that the general solution is a fractional linear function in the constant of integration. In applications, Riccati differential equations appear in the classical problems of the calculus of variations and in the associated disciplines of optimal control and filtering

: BC

2019-01-07 08:39