Spectral behaviour of a simple non-self-adjoint operator
Abstract
We investigate the spectrum of a typical non-self-adjoint differential operator AD=-d2/dx2 A acting on (0,1) C2, where A is a 2× 2 constant matrix. We impose Dirichlet and Neumann boundary conditions in the first and second coordinate respectively at both ends of [0,1]⊂R. For A∈ R2× 2 we explore in detail the connection between the entries of A and the spectrum of AD, we find necessary conditions to ensure similarity to a self-adjoint operator and give numerical evidence that suggests a non-trivial spectral evolution.
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