Comparison theorems for the matrix riccati equation

New upper and lower matrix bounds and the corresponding eigenvalue bounds on the solution of the discrete algebraic Riccati equation are discussed in this paper. The present bounds are tighter than the majority of those found in the literature.

## Abstract Our aim in this paper is to obtain the comparison principles which extend those of Grace and LALLI. The equations. L~n~u(t)±f(t, u[g(t)]= 0 are compared with the equations. M~n~u(t)±z(t)h([τ(t)])= 0.

An effective numerical computation of the steadystate Riccati matrix is based on the successive solutions of a Lyapunov equation using Newton's method. The requirements of this algorithm are an initial stabilizing matrix and the numerical solution of the associated Lyapunov equation. Computationally

Algebraic matrix Riccati equations are considered which arise in the optimal filtering as well as in control problems of continuous time-invariant systems. A necessary and sufficient condition is established for the existence of unique positivedefinite solutions and the asymptotically stable closed-

## 0 with r ) 0 and m ) 1, and show some applications of the theorem to the nonexistence problem of positive solutions of quasilinear equations. Basic models leading to such nonlinear equations are the degenerate Laplace equation and the steady-state porous medium equation.