An index theorem for Schr\"odinger operators on metric graphs
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🧮 math.SP
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indexmaslovmetricodingeroperatorsschradditionconditions
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We show that the spectral flow of a one-parameter family of Schr\"odinger operators on a metric graph is equal to the Maslov index of a path of Lagrangian subspaces describing the vertex conditions. In addition, we derive an Hadamard-type formula for the derivatives of the eigenvalue curves via the Maslov crossing form.
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