Analytic solution with a priori error bounds for a class of mixed coupled partial differential equations

In this paper, the existence of a sequence of stable solutions X(n) of the parametric matrix equation Z(2) + AZ - n(2)B = 0 so that {X(n)/n} converges to a stable matrix is studied. The result is used for solving mixed problems related to the coupled second-order partial differential system mu(tt) + A mu(xx) + B mu(t) = 0.