AbstractMotivated by the study of linear quadratic differential games, we introduce a new class of nonsymmetric algebraic Riccati equations. It is shown that every equation in this class has a unique stabilizing solution, which is the solution required to find the open-loop Nash equilibrium for the differential game. We show that the doubling algorithm can be used to find this solution efficiently. The solution may also be found by the Schur method, and under further assumptions by Newton’s method and a basic fixed-point iteration
The problem of reducing an algebraic Riccati equation $XCX-AX-XD+B=0$ to a unilateral quadratic matr...
AbstractWe consider the nonsymmetric algebraic Riccati equation XM12X+XM11+M22X+M21=0, where M11,M12...
AbstractConsider the continuous-time algebraic Riccati equation (CARE) and the discrete-time algebra...
AbstractMotivated by the study of linear quadratic differential games, we introduce a new class of n...
AbstractWe consider the initial value problem for a nonsymmetric matrix Riccati differential equatio...
Consider an iterative modification of the linearized Newton method for computing the minimal nonnega...
We survey on theoretical properties and algorithms concerning the problem of solving a nonsymmetric ...
In this paper, we propose a structure-preserving doubling algorithm (SDA) for the computation of the...
AbstractIn this paper an explicit closed form solution of Riccati differential matrix equations appe...
AbstractWe survey recent and also older results on nonsymmetric matrix Riccati differential equation...
In this note we reconsider the indefinite open-loop Nash linear quadratic differential game with an ...
AbstractIn this paper, we propose structured doubling algorithms for the computation of the weakly s...
AbstractIn this paper an explicit computable solution in terms of data dimension for a class of stro...
We study the nonsymmetric algebraic Riccati equation whose four coefficient matrices are the blocks ...
Abstract. We study the nonsymmetric algebraic Riccati equation whose four coefficient matri-ces are ...
The problem of reducing an algebraic Riccati equation $XCX-AX-XD+B=0$ to a unilateral quadratic matr...
AbstractWe consider the nonsymmetric algebraic Riccati equation XM12X+XM11+M22X+M21=0, where M11,M12...
AbstractConsider the continuous-time algebraic Riccati equation (CARE) and the discrete-time algebra...
AbstractMotivated by the study of linear quadratic differential games, we introduce a new class of n...
AbstractWe consider the initial value problem for a nonsymmetric matrix Riccati differential equatio...
Consider an iterative modification of the linearized Newton method for computing the minimal nonnega...
We survey on theoretical properties and algorithms concerning the problem of solving a nonsymmetric ...
In this paper, we propose a structure-preserving doubling algorithm (SDA) for the computation of the...
AbstractIn this paper an explicit closed form solution of Riccati differential matrix equations appe...
AbstractWe survey recent and also older results on nonsymmetric matrix Riccati differential equation...
In this note we reconsider the indefinite open-loop Nash linear quadratic differential game with an ...
AbstractIn this paper, we propose structured doubling algorithms for the computation of the weakly s...
AbstractIn this paper an explicit computable solution in terms of data dimension for a class of stro...
We study the nonsymmetric algebraic Riccati equation whose four coefficient matrices are the blocks ...
Abstract. We study the nonsymmetric algebraic Riccati equation whose four coefficient matri-ces are ...
The problem of reducing an algebraic Riccati equation $XCX-AX-XD+B=0$ to a unilateral quadratic matr...
AbstractWe consider the nonsymmetric algebraic Riccati equation XM12X+XM11+M22X+M21=0, where M11,M12...
AbstractConsider the continuous-time algebraic Riccati equation (CARE) and the discrete-time algebra...