M. Pikula, D. Nedić, Ismet Kalco, Ljiljanka Kvesić
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Inverse spectral boundary problem Sturm Liouville type with constant delay and non-zero initial function
This paper is dedicated to solving of the direct and inverse spectral problem for Sturm Liouville type of operator with constant delay from 𝜋/2 to 𝜋, non-zero initial function and Robin’s boundary conditions. It has been proved that two series of eigenvalues unambiguously define the following parameters: delay, coefficients of delay within boundary conditions, the potential on the segment from the point of delay to the right-hand side of the distance and the product of the starting function and potential from the left end of the distance to the delay point.
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