Inverse problem for a damped Stieltjes string from parts of spectra

Abstract: We solve the following inverse problem for boundary value problems generated by the difference equations describing the motion of a Stieltjes string (a thread with beads). Given are certain parts of the spectra of two boundary value problems with two different Robin conditions at the left end and the same damping condition at the right end. From these two partial spectra, the difference of the Robin parameters, the damping constant, and the total length of the string, find the values of the point masses, and o… Show more

“…An inverse problem for a Stieltjes string damped at one end was solved in [13,14]. In [7] an inverse problem for a damped Stieltjes string from parts of spectra was solved.…”

“…2k−2 (λ 2 ) are polynomials of degree 2k − 2 which can be obtained by solving (7) and 8, respectively. We set…”

Direct and inverse spectral problems for a star graph of Stieltjes strings damped at a pendant vertex

“…An inverse problem for a Stieltjes string damped at one end was solved in [13,14]. In [7] an inverse problem for a damped Stieltjes string from parts of spectra was solved.…”

“…2k−2 (λ 2 ) are polynomials of degree 2k − 2 which can be obtained by solving (7) and 8, respectively. We set…”

Direct and inverse spectral problems for a star graph of Stieltjes strings damped at a pendant vertex

Inverse Problem for a Stieltjes String Damped at an Interior Point

On the Relationship Between the Multiplicities of Eigenvalues in Finite- and Infinite-Dimensional Problems on Graphs