| Analytical solutions in the theory of thin bodies MU Nikabadze, AR Ulukhanyan Generalized Continua as Models for Classical and Advanced Materials, 319-361, 2016 | 17 | 2016 |
| On some variational principles in micropolar theories of single-layer thin bodies M Nikabadze, A Ulukhanyan Continuum Mechanics and Thermodynamics 35 (3), 1147-1164, 2023 | 13 | 2023 |
| Математическое моделирование упругих тонких тел с одним малым размером с помощью систем ортогональных полиномов МУ Никабадзе, АР Улуханян | 13 | 2008 |
| Statements of problems for a thin deformable three-dimensional body MU Nikabadze, AR Ulukhanyan Vestnik Moskov. Univ. Ser. I. Mat. Mekh, 43-49, 2005 | 13 | 2005 |
| Mathematical modeling of elastic thin bodies with one small dimension with the use of systems of orthogonal polynomials MU Nikabadze, AR Ulukhanyan Preprint VINITI No, 723-B2008, 2008 | 11 | 2008 |
| Постановки задач для тонкого деформируемого трехмерного тела МУ Никабадзе, АР Улуханян Вестник Московского университета. Серия 1: Математика. Механика, 43-49, 2005 | 11 | 2005 |
| Generalized Reissner-type variational principles in the micropolar theories of multilayer thin bodies with one small size M Nikabadze, A Ulukhanyan Continuum Mechanics and Thermodynamics 35 (4), 1207-1221, 2023 | 10 | 2023 |
| Some applications of eigenvalue problems for tensor and tensor–block matrices for mathematical modeling of micropolar thin bodies M Nikabadze, A Ulukhanyan Mathematical and Computational Applications 24 (1), 33, 2019 | 10 | 2019 |
| Some variational principles in the three-dimensional micropolar theories of solids and thin solids M Nikabadze, A Ulukhanyan Theoretical Analyses, Computations, and Experiments of Multiscale Materials …, 2022 | 9 | 2022 |
| Modeling of multilayer thin bodies M Nikabadze, A Ulukhanyan Continuum Mechanics and Thermodynamics 32, 817-842, 2020 | 8 | 2020 |
| Representation of solutions to equations of hyperbolic type AR Ulukhanyan Moscow university mechanics bulletin 65 (2), 47-50, 2010 | 8 | 2010 |
| Уравнения движения и граничные условия физического содержания микрополярной теории тонких тел с двумя малыми размерами ММ Кантор, МУ Никабадзе, АР Улуханян Известия Российской академии наук. Механика твердого тела, 96-110, 2013 | 7 | 2013 |
| Dynamic equations of the theory of thin prismatic bodies with expansion in the system of Legendre polynomials AR Ulukhanyan Mechanics of solids 46, 467-479, 2011 | 7 | 2011 |
| К математическому моделированию упругих тонких тел и численная реализация некоторых задач о полосе МУ Никабадзе, ММ Кантор, АР Улуханян | 7 | 2011 |
| On the decomposition of equations of micropolar elasticity and thin body theory M Nikabadze, A Ulukhanyan Lobachevskii Journal of Mathematics 41, 2060-2075, 2020 | 6 | 2020 |
| Mathematical modeling of elastic thin bodies with one small size M Nikabadze, A Ulukhanyan Higher Gradient Materials and Related Generalized Continua, 155-199, 2019 | 6 | 2019 |
| Formulations of problems for a shell domain according to three-dimensional theories MU Nikabadze, AR Ulukhanyan Preprint VINITI No, 83-B2005, 2005 | 6 | 2005 |
| Equations of motion and boundary conditions of physical meaning of micropolar theory of thin bodies with two small cuts MM Kantor, MU Nikabadze, AR Ulukhanyan Mechanics of Solids 48, 317-328, 2013 | 5 | 2013 |
| To mathematical modeling of elastic thin bodies and numerical realization of several problems on the band MU Nikabadze, MM Kantor, AR Ulukhanian Manuscript in VINITI Ross. Akad. Nauk 207, 204-B2011in, 2011 | 5 | 2011 |
| Постановка задач для оболочечной области по трехмерным теориям МУ Никабадзе, АР Улуханян | 5 | 2005 |
