- Alexander V. Shapovalov, Anton E. Kulagin, Sergei A. Siniukov, “Family of Asymptotic Solutions to the Two-Dimensional Kinetic Equation with a Nonlocal Cubic Nonlinearity”, Symmetry, 14, no. 3, 2022, 577
- Anton E. Kulagin, Alexander V. Shapovalov, “A Semiclassical Approach to the Nonlocal Nonlinear Schrödinger Equation with a Non-Hermitian Term”, Mathematics, 12, no. 4, 2024, 580
- A. V. Shapovalov, A. Yu. Trifonov, “Adomian Decomposition Method for the One-dimensional Nonlocal Fisher–Kolmogorov–Petrovsky–Piskunov Equation”, Russ Phys J, 62, no. 4, 2019, 710
- Alexander V. Shapovalov, Anton E. Kulagin, “Semiclassical Approach to the Nonlocal Kinetic Model of Metal Vapor Active Media”, Mathematics, 9, no. 23, 2021, 2995
- Anton E Kulagin, Alexander V Shapovalov, “Quasiparticles for the one-dimensional nonlocal Fisher-Kolmogorov-Petrovskii-Piskunov equation”, Phys. Scr., 99, no. 4, 2024, 045228
- Alexander Shapovalov, Andrey Trifonov, “Approximate Solutions and Symmetry of a Two-Component Nonlocal Reaction-Diffusion Population Model of the Fisher–KPP Type”, Symmetry, 11, no. 3, 2019, 366
- S. A. Siniukov, A. Yu. Trifonov, A. V. Shapovalov, “Examples of Asymptotic Solutions Obtained by the Complex Germ Method for the One-Dimensional Nonlocal Fisher–Kolmogorov–Petrovsky–Piskunov Equation”, Russ Phys J, 64, no. 8, 2021, 1542
- A. V. Shapovalov, A. E. Kulagin, S. A. Siniukov, “Pattern Formation in a Nonlocal Fisher–Kolmogorov–Petrovsky–Piskunov Model and in a Nonlocal Model of the Kinetics of an Metal Vapor Active Medium”, Russ Phys J, 65, no. 4, 2022, 695
- Orestes Tumbarell Aranda, Fernando A. Oliveira, “Analytical and Numerical Solutions of the Riccati Equation Using the Method of Variation of Parameters. Application to Population Dynamics”, Journal of Computational and Nonlinear Dynamics, 15, no. 10, 2020, 101009
- Orestes Tumbarell Aranda, André L.A. Penna, Fernando A. Oliveira, “Nonlinear self-organized population dynamics induced by external selective nonlocal processes”, Communications in Nonlinear Science and Numerical Simulation, 93, 2021, 105512