Spectral analysis of non-local Schr\"odinger operators
Abstract
We study spectral properties of convolution operators L and their perturbations H= L+v(x) by compactly supported potentials. Results are applied to determine the front propagation of a population density governed by operator H with a compactly supported initial density provided that H has positive eigenvalues. If there is no positive spectrum, then the stabilization of the population density is proved.
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