Spectrum of One-Dimensional Potential Perturbed by a Small Convolution Operator: General Structure
Permanent link
https://hdl.handle.net/10037/32308Date
2023-09-23Type
Journal articleTidsskriftartikkel
Peer reviewed
Abstract
We consider an operator of multiplication by a complex-valued potential in L2(R), to
which we add a convolution operator multiplied by a small parameter. The convolution kernel is
supposed to be an element of L1(R), while the potential is a Fourier image of some function from
the same space. The considered operator is not supposed to be self-adjoint. We find the essential
spectrum of such an operator in an explicit form. We show that the entire spectrum is located in a
thin neighbourhood of the spectrum of the multiplication operator. Our main result states that in
some fixed neighbourhood of a typical part of the spectrum of the non-perturbed operator, there are
no eigenvalues and no points of the residual spectrum of the perturbed one. As a consequence, we
conclude that the point and residual spectrum can emerge only in vicinities of certain thresholds in
the spectrum of the non-perturbed operator. We also provide simple sufficient conditions ensuring
that the considered operator has no residual spectrum at all.
Publisher
MDPICitation
Borisov, Piatnitski, Zhizhina. Spectrum of One-Dimensional Potential Perturbed by a Small Convolution Operator: General Structure. Mathematics. 2023;11(19)Metadata
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