Add to ORKGAbstract: We consider an ordinary differential equation (ODE) which can be written as a polynomial in variables and derivatives. Several types of asymptotic expansions of its solutions can be found by algorithms of 2D Power Geometry. They are power, power-logarithmic, exotic and complicated expansions. Here we develop 3D Power Geometry and apply it for calculation power-elliptic expansions of solutions to an ODE. Among them we select regular power-elliptic expansions and give a survey of all such expansions in solutions of the Painlevé equations P1,…,P6.Note: Research direction:Mathematical modelling in actual problems of science and technic
Abstract: We consider the fifth Painlev´e equation in a neighborhood of infinity. By means...
Abstract: We consider a system of ordinary differential equations of very general form. We...
Abstract: We consider the third Painlev´e equation in the case when all its four complex p...
Abstract: We consider an ordinary differential equation of a very general form. For it, we...
Abstract: Here we set out algorithm based on the three-dimensional power geometry, which a...
Abstract: We consider the complicated and exotic asymptotic expansions of solutions to a p...
Abstract: We consider an ordinary differential equation of a very general form. For it, we...
Abstract: Here we present basic ideas and algorithms of Power Geometry and give a survey o...
Abstract: The article is devoted to the study of the fifth Painlev'e equation which has 4 ...
Abstract: By means of Power Geometry, shortly described in §1, in the generic case we comp...
Abstract: We consider an ordinary differential equation of the fourth order, which is the ...
Abstract: We consider the complicated and exotic asymptotic expansions of solutions to a p...
Abstract: By means of Power Geometry, shortly presented in §1, in the generic case we comp...
Abstract: We compute all power expansions of solutions to the first Painleve equation by t...
Abstract: We consider an ordinary differential equation of a very general form. We show h...
Abstract: We consider the fifth Painlev´e equation in a neighborhood of infinity. By means...
Abstract: We consider a system of ordinary differential equations of very general form. We...
Abstract: We consider the third Painlev´e equation in the case when all its four complex p...
Abstract: We consider an ordinary differential equation of a very general form. For it, we...
Abstract: Here we set out algorithm based on the three-dimensional power geometry, which a...
Abstract: We consider the complicated and exotic asymptotic expansions of solutions to a p...
Abstract: We consider an ordinary differential equation of a very general form. For it, we...
Abstract: Here we present basic ideas and algorithms of Power Geometry and give a survey o...
Abstract: The article is devoted to the study of the fifth Painlev'e equation which has 4 ...
Abstract: By means of Power Geometry, shortly described in §1, in the generic case we comp...
Abstract: We consider an ordinary differential equation of the fourth order, which is the ...
Abstract: We consider the complicated and exotic asymptotic expansions of solutions to a p...
Abstract: By means of Power Geometry, shortly presented in §1, in the generic case we comp...
Abstract: We compute all power expansions of solutions to the first Painleve equation by t...
Abstract: We consider an ordinary differential equation of a very general form. We show h...
Abstract: We consider the fifth Painlev´e equation in a neighborhood of infinity. By means...
Abstract: We consider a system of ordinary differential equations of very general form. We...
Abstract: We consider the third Painlev´e equation in the case when all its four complex p...