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Numerical Range and Quadratic Numerical Range for Damped Systems

Abstract

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\ddot{z}(t) + D \dot{z} (t) + A_0 z(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 A0A_0. By means of the quadratic numerical range, we establish tight spectral estimates in terms of the unbounded operator coefficients A0A_0 and DD which improve earlier results for sectorial and selfadjoint DD; 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

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