We prove new enclosures for the spectrum of non-selfadjoint operator matrices
associated with second order linear differential equations z¨(t)+Dz˙(t)+A0z(t)=0 in a Hilbert space. Our main tool is the quadratic
numerical range for which we establish the spectral inclusion property under
weak assumptions on the operators involved; in particular, the damping operator
only needs to be accretive and may have the same strength as A0. By means of
the quadratic numerical range, we establish tight spectral estimates in terms
of the unbounded operator coefficients A0 and D which improve earlier
results for sectorial and selfadjoint D; in contrast to numerical range
bounds, our enclosures may even provide bounded imaginary part of the spectrum
or a spectral free vertical strip. An application to small transverse
oscillations of a horizontal pipe carrying a steady-state flow of an ideal
incompressible fluid illustrates that our new bounds are explicit.Comment: 27 page