Multipoint scatterers with bound states at zero energy
P. G. Grinevich, R. G. Novikov

This publication is cited in the following articles:

1. M. M. Malamud, V. V. Marchenko, “On Kernels of Invariant Schrödinger Operators with Point Interactions. Grinevich–Novikov Conjecture”, Dokl. Math., 109:2 (2024), 125  
2. M. M. Malamud, V. V. Marchenko, “On kernels of invariant Schrödinger operators with point interactions. Grinevich–Novikov problem”, Doklady Rossijskoj akademii nauk. Matematika, informatika, processy upravleniâ, 516 (2024), 31  
3. P. G. Grinevich, R. G. Novikov, “Spectral inequality for Schrödinger's equation with multipoint potential”, Russian Math. Surveys, 77:6 (2022), 1021–1028              
4. W. Xie, W. Deng, J. Hu, Y. Gai, X. Li, J. Zhang, D. Long, S. Qiao, F. Jiang, “Construction of bimetallic FeCo-SA/DABCO nanosheets by modulating the electronic structure for improved electrocatalytic oxygen evolution”, CrystEngComm, 24:35 (2022), 6239  
5. P. G. Grinevich, R. G. Novikov, “Transmission eigenvalues for multipoint scatterers”, Eurasian J. Math. Comput. Appl., 9:4 (2021), 17–25    
6. Raffaele Scandone, Springer INdAM Series, 42, Mathematical Challenges of Zero-Range Physics, 2021, 149  
7. R. G. Novikov, “Inverse scattering for the Bethe-Peierls model”, Eurasian J. Math. Comput. Appl., 6:1 (2018), 52–55  
8. R. G. Novikov, “Inverse scattering for the Bethe–Peierls model”, Eurasian Journal of Mathematical and Computer Applications, 6:1 (2018), 52–55