| The problem of solving the nonlinear matrix equation, is mainly to determine the solution of the equation by the information of parameters of the equation. From the application point of view, the Hermitian positive solution is more important, about which are we concerned. In the sequel, a solution always means a Hermitian positive definite one. In practice, the equation X + A*X~qA = I arises in various areas of applications, including control theory, dynamic programming, statistic, the finite difference approximation to an elliptic partial differential equation, and so on. The study of this kind of problem has three basic problems: (1)the theoretic issue on solvability, ie.. the necessary and sufficient conditions for the existence of the solution: (2)the numerical solution, ie.. the effective numerical ways; (3)the analysis of the perturbation.First, in this paper, we discuss the existence of the solution of the equationX + A*X~qA = I, α > 0 by the following theorems.Theorem 1 If A'A < I ,then Eq.(1) has a positive definite solution . Theorem 2 If A*A ≥ I,then Eq.(1) has a nonegative definite solution. Second , if the equation has a solution X,we can know some properties of the solution according the following theorems.Theorem 3 For the solution X of Eq.(1) when A*A < I . we havewhereTheorem 4 For the solution X of Eq.(1) when A*A < I . we have... |
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