1-D Schr\"odinger operator on a star graph with nondefinite weight function
Abstract
On a star graph G with n = n+ + n- edges of unit length, we study the operator -d2d x2 on n+ and d2d x2 on n- edges equipped with Dirichlet boundary conditions at the outer vertices and a Kirchhoff condition at the central vertex. We study the spectral properties of the corresponding indefinite Kirchhoff Laplacian on G and we show that it is similar to a selfadjoint operator in the Hilbert space L2(G) and that its eigenfunctions form a Riesz basis. Furthermore, we give a complete description of the point spectrum.
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