1.Bodrenko I.I. O PODMNOGOOBRAZIYaKh S TsIKLIChESKI REKURRENTNOI VTOROI FUNDAMENTALNOI ORMOI / Bodrenko I.I. // Sovremennye problemy matematiki i mekhaniki. Matematika. 2011. Tom 4. Vypusk 2. S. 167-171. — Moskva : Izdatelstvo MGU, 2011. — 5 s.
2.Bodrenko I.I. O podmnogoobraziyakh s tsiklicheski rekurrentnoi vtoroi fundamentalnoi formoi v evklidovykh prostranstvakh / Bodrenko I.I. — Moskva : Izdatelstvo TVP, 2011. — str. 746-747 — ISSN 0869-8325
I. I. Bodrenko, “Conditions for the parallelism of the normal curvature tensor of submanifolds”, Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 181 (2020), 3–8
2019
2.
I. I. Bodrenko, “On submanifolds with a parallel normal vector field in spaces of constant curvature”, Itogi Nauki i Tekhniki. Sovrem. Mat. Pril. Temat. Obz., 169 (2019), 3–10
2014
3.
I. I. Bodrenko, “A Generalization of Bonnet's Theorem on Darboux Surfaces”, Mat. Zametki, 95:6 (2014), 812–820; Math. Notes, 95:6 (2014), 760–767
I. I. Bodrenko, “Some properties of normal sections and geodesics
on cyclic recurrent submanifolds”, Vestnik Volgogradskogo gosudarstvennogo universiteta. Seriya 1. Mathematica. Physica, 2014, no. 2(21), 6–16
1994
5.
I. I. Bodrenko, “A characteristic feature of the $n$-dimensional sphere in the Euclidean space $E^{n+p}$”, Mat. Sb., 185:11 (1994), 23–30; Russian Acad. Sci. Sb. Math., 83:2 (1995), 315–320
I. I. Bodrenko, “On submanifolds with zero normal torsion in Euclidean space”, Sibirsk. Mat. Zh., 35:3 (1994), 527–536; Siberian Math. J., 35:3 (1994), 470–478
I. I. Bodrenko, “On $n$-dimensional surfaces in Euclidean space $E^{n+p}$ that belong to an $(n+1)$-dimensional plane”, Mat. Zametki, 54:4 (1993), 19–23; Math. Notes, 54:4 (1993), 992–994