Non-compact perturbations of the spectrum of multipliers given with functions

The change in the spectrum of the multipliers H0 f (x, y) = x^a + y^e f (x, y) and H0f (x, y) = x^ay^e f (x, y) for perturbation with partial integral operators in the spaces L2 [0, 1]² is studied. Precise description of the essential spectrum and the existence of simple eigenvalue is received. We prove that the number of eigenvalues located below the lower edge of the essential spectrum in the model is finite.

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