| List of publications: |
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Citations (Crossref Cited-By Service + Math-Net.Ru) |
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| 1. |
S. V. Konyagin, A. A. Kuleshov, “On the Continuity of Finite Sums of Ridge Functions”, Math. Notes, 98:2 (2015), 336–338       |
| 2. |
S. V. Konyagin, A. A. Kuleshov, “On some properties of finite sums of ridge functions defined on convex subsets of $\mathbb R^n$”, Proc. Steklov Inst. Math., 293 (2016), 186–193 |
| 3. |
S. V. Konyagin, A. A. Kuleshov, V. E. Maiorov, “Some Problems in the Theory of Ridge Functions”, Proc. Steklov Inst. Math., 301 (2018), 144–169 |
| 4. |
A. A. Kuleshov, “On some properties of smooth sums of ridge functions”, Proc. Steklov Inst. Math., 294 (2016), 89–94 |
| 5. |
V. A. Il'in, A. A. Kuleshov, “Equivalence of two definitions of a generalized $L_p$ solution to the initial-boundary value problem for the wave equation”, Proc. Steklov Inst. Math., 284 (2014), 155–160 |
| 6. |
A. A. Kuleshov, “Continuous Sums of Ridge Functions on a Convex Body and the Class VMO”, Math. Notes, 102:6 (2017), 799–805 |
| 7. |
A.A.Kuleshov, “Mixed problems for the equation of longitudinal vibrations of a heterogeneous rod with a free or fixed right end consisting of two segments with different densities and elasticities”, Doklady Mathematics, 85:1 (2012), 80-82  |
| 8. |
V. A. Il'in, A. A. Kuleshov, “On some properties of generalized solutions of the wave equation in the classes $L_p$ and $W_p^1$ for $p\ge 1$”, Differ. Equ., 48:11 (2012), 1470–1476 |
| 9. |
A.A.Kuleshov, “Mixed problems for the equation of longitudinal vibrations of a heterogeneous rod and for the equation of transverse vibrations of a heterogeneous string consisting of two segments with different densities and elasticities”, Doklady Mathematics, 85:1 (2012), 98-101 |
| 10. |
V. A. Il'in, A. A. Kuleshov, “Necessary and sufficient conditions for a generalized solution to the initial-boundary value problem for the wave equation to belong to $W^1_p$ with $p\geq1$”, Proc. Steklov Inst. Math., 283 (2013), 110–115 |
| 11. |
V. A. Il'in, A. A. Kuleshov, “Integral identity definition of a generalized solution in the class $L_p$ to a mixed problem for the wave equation”, Dokl. Math., 86:3 (2012), 770–773 |
| 12. |
V. A. Il'in, A. A. Kuleshov, “Generalized solutions of the wave equation in the classes $L_p$ and $W_p^1$ with $p\ge 1$”, Dokl. Math., 86:2 (2012), 657–660 |
| 13. |
V. A. Il'in, A. A. Kuleshov, “Necessary and sufficient condition for the generalized solution of a mixed problem for the wave equation to belong to the class $L_p$ for $p\ge 1$”, Differ. Equ., 48:12 (2012), 1572–1576 |
| 14. |
A.A.Kuleshov, “On four mixed problems for the string vibration equation with homogeneous nonlocal conditions”, Differential equations, 45:6 (2009), 828-835 |
| 15. |
A.A.Nikitin, A.A.Kuleshov, “Optimization of the boundary control induced by the third boundary condition”, Differential equations, 44:5 (2008), 701-711 |
| 16. |
A.Kuleshov, “The Various Definitions of Multiple Differentiability of a Function f: ℝn→ ℝ”, Mathematics, 8:11 (2020), 1946 , 6 pp. |
| 17. |
A. A. Kuleshov, “Continuous Sums of Ridge Functions on a Convex Body with Dini Condition on Moduli of Continuity at Boundary Points”, Analysis Mathematica, 45 (2019), 335-345 |
| 18. |
A. A. Kuleshov, I. S. Mokrousov, I. N. Smirnov, “Solvability of mixed problems for the Klein–Gordon–Fock equation in the class $L_p$ for $p\ge 1$”, Differ. Equ., 54:3 (2018), 330–334 |
| 19. |
V. A. Il'in, A. A. Kuleshov, “Criterion for a generalized solution in the class $L_p$ for the wave equation to be in the class $W_p^1$”, Dokl. Math., 86:3 (2012), 740–742 |
| 20. |
V. A. Il'in, A. A. Kuleshov, “A criterion for the membership in the class $L_p$ with $p\ge 1$ of the generalized solution to the mixed problem for the wave equation”, Dokl. Math., 86:2 (2012), 688–690 |
| 21. |
A.A.Kuleshov, “Mixed Problems for the String Vibration Equation with Homogeneous Boundary Conditions and Inhomogeneous Nonlocal Conditions”, Differential equations, 46:1 (2010), 101-107 |
| 22. |
A.A.Kuleshov, “Four Mixed Problems for the Vibrating String Equation with Boundary and Nonlocal Dirichlet and Neumann Conditions”, Doklady Mathematics, 79:3 (2009), 362-364 |
| 23. |
M. D. Kovalev, A. A. Kuleshov, “On Properties of Continuous Monotone Functions”, Math. Notes, 113:6 (2023), 874–878 |
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