I. Yu. Domanov. On Cyclic and Invariant Subspaces of the Operator $J\otimes B$ in the Sobolev spaces of vector functions // Methods of Functional Analysis and Topology, v. 5, no. 1, 1999, p. 1–12.
I. Yu. Domanov. On Cyclic and Invariant Subspaces of the Operator $J\otimes B$ in the Sobolev spaces // Dopov. NAN of Ukraine, no. 5, 1999, p. 20–25.
I. Yu. Domanov, M. M. Malamud. On the lattices of Invariant Subspaces and hyperinvariant Subspaces of the Operator $J^\alpha\otimes B$ in the Sobolev spaces // Matem. Zametki, v. 70, no. 4, 2001, p. 60.
I. Yu. Domanov, M. M. Malamud, Invariant subspaces and hyperinvariant subspaces of an operator $J^\alpha$ defined on Sobolev spaces // Dopov. NAN of Ukraine, no. 7, 2001, p. 37–42.
I. Yu. Domanov, A. V. Kononovich. A description of the reflexive finite-dimensional operators // Spectral and evolutionary problems, v. 11, Proc. of the eleventh Crimean Autumn Math. School-Symposium, Simferopol, 2001, p. 32–33.
И. Ю. Доманов, “Спектральный анализ степеней оператора $(Vf)(x)=q(x)\int_0^xw(t)f(t)dt$”, Матем. заметки, 73:3 (2003), 444–449; I. Yu. Domanov, “Spectral Analysis of Powers of the Operator $(Vf)(x)=q(x)\int_0^xw(t)f(t)dt$”, Math. Notes, 73:3 (2003), 408–413
И. Ю. Доманов, “О циклических подпространствах оператора $(Vf)(x)=q(x)\displaystyle\int_0^xw(t)f(t)\,dt$”, УМН, 58:1(349) (2003), 183–184; I. Yu. Domanov, “On cyclic subspaces of the operator $(Vf)(x)=q(x)\displaystyle\int_0^xw(t)f(t)\,dt$”, Russian Math. Surveys, 58:1 (2003), 177–179
2002
3.
И. Ю. Доманов, “О спектральной кратности некоторых вольтерровых операторов в соболевских пространствах”, Матем. заметки, 72:2 (2002), 306–311; I. Yu. Domanov, “On the Spectral Multiplicity of Some Volterra Operators in Sobolev Spaces”, Math. Notes, 72:2 (2002), 275–280
И. Ю. Доманов, М. М. Маламуд, “О решетках инвариантных и гиперинвариантных подпространств операторов $J^\alpha\otimes B$ в соболевских пространствах”, Матем. заметки, 70:4 (2001), 560–567; I. Yu. Domanov, M. M. Malamud, “Invariant and Hyperinvariant Subspace Lattices of Operators $J^\alpha\otimes B$ in Sobolev Spaces”, Math. Notes, 70:4 (2001), 508–514