Closed-form solutions to differential eigenvalue problems associated w
ith natural conservative systems, albeit self-adjoint, can be obtained
in only a limited number of cases. Approximate solutions generally re
quire spatial discretization, which amounts to approximating the diffe
rential eigenvalue problem by an algebraic eigenvalue problem. If the
discretization process is carried out by the Rayleigh-Ritz method in c
onjunction with the variational approach, then the approximate eigenva
lues can be characterized by means of the Courant and Fischer maximin
theorem and the separation theorem. The latter theorem can be used to
demonstrate the convergence of the approximate eigenvalues thus derive
d to the actual eigenvalues. This paper develops a maximin theorem and
a separation theorem for discretized gyroscopic conservative systems,
and provides a numerical illustration.