The inverse problem for differential pencils with eigenparameter dependent boundary conditions from interior spectral data (Q441916)

The papers deals with the inverse problem for the differential pencil \(L=L(q,p,h_0,h_1,H_0,H_1)\) defined by NEWLINE\[NEWLINE Ly:=-y''+(q(x)+2\lambda p(x))y=\lambda^2 y,\quad x\in [0,\pi] NEWLINE\]NEWLINE with boundary conditions NEWLINE\[NEWLINE U(y):=y'(0,\lambda)-(h_1\lambda+h_0)y(0,\lambda)=0, NEWLINE\]NEWLINE and NEWLINE\[NEWLINE V(y):=y'(\pi,\lambda)+(H_1\lambda+H_0)y(\pi,\lambda)=0. NEWLINE\]NEWLINE The author shows that if the coefficients \(h_j\), \(j=0,1\) are given, then the potentials \((q(x),p(x))\) and the coefficients \(H_j\), \(j=0,1\), can be uniquely determined by a set of values of eigenfunctions at some interior point and parts of two spectra.