References
- Borg, G, 1945. Eine umkehrung der Sturm-Liouvillesehen eigenwertaufgabe, Acta Math. 78 (1945), pp. 1–96.
- Hochstadt, H, 1973. The inverse Sturm–Liouville problem, Commun. Pure Appl. Math. 26 (1973), pp. 715–729.
- Gelfand, IM, and Levitan, BM, 1951. On the determination of a differential equation from its spectral function, Amer. Math Soc. Trans. 1 (1951), pp. 253–304.
- Gesztesy, F, and Simon, B, 2000. Inverse spectral analysis with partial information on the potential. II: The case of discrete spectrum, Trans. Am. Math. Soc. 352 (2000), pp. 2765–2787.
- Gesztesy, F, and Simon, B, 2000. On local Borg–Marchenko uniqueness results, Commun. Math. Phys. 211 (2) (2000), pp. 273–287.
- Malamud, MM, 1999. Uniqueness questions in inverse problems for systems of differential equations on a finite interval, Trans. Moscow Math Soc. 60 (1999), pp. 204–262.
- McLaughlin, JR, 1988. Inverse spectral theory using nodal points as data–a uniqueness result, J. Diff. Eq. 73 (1988), pp. 354–362.
- Hald, O, and McLaughlin, JR, 1989. Solutions of inverse nodal problems, Inv. Prob. 5 (1989), pp. 307–347.
- Browne, PJ, and Sleeman, BD, 1996. Inverse nodal problem for Sturm–Liouville equation with eigenparameter depend boundary conditions, Inverse Problems 12 (1996), pp. 377–381.
- Yang, X-F, 1997. A solution of the inverse nodal problem, Inv. Probl. 13 (1997), pp. 203–213.
- Cheng, YH, Law, C-K, and Tsay, J, 2000. Remarks on a new inverse nodal problem, J. Math. Anal. Appl. 248 (2000), pp. 145–155.
- Koyunbakan, H, 2005. Inverse nodal problem for singular differential operator, J. Inverse Ill-posed Probl. 13 (5) (2005), pp. 435–440.
- Hochstadt, H, 1967. On inverse problems associated with second-order differential operators, Acta Math. 119 (1967), pp. 173–192.
- Shen, CL, and Tsai, TM, 1995. On a uniform approximation of the density function of a string equation using eigenvalues and nodal points and some related inverse nodal problems, Inv. Prob. 11 (1995), pp. 1113–1123.
- Chen, Y-T, Cheng, YH, Law, CK, and Tsa, J, 2002. Convergence of the reconstruction formula for the potential function, Proc. Amer. Math. Soc. 130 (2002), pp. 2319–2324.