Add to ORKGThis research is about the simulation of a mechanical system consisting of a mass, a spring, a shock absorber and the application of an external force, allows to understand the analytical and numerical behavior of the differential equation that governs said event. In this analysis the differential equation is obtained and solved analytically and numerically, for the numerical solution Simulink was used, since this allows the design and simulation of a system of textual and graphic form, which are fundamental elements for programming and operation of a system. This research is about the simulation of a mechanical system consisting of a mass, a spring, a shock absorber and the application of an external force, allows to understand the analyti...
In this paper, Anything Goes: The Sonnenschein-Mantel-Debreu theorem (following the work of Sonnench...
In a project at Beihang University different methods to model, simulate and identify nonlinear mecha...
In this paper, we investigate the existence, uniqueness, and stability of the periodic solution for ...
In this paper we study the boundedness of solutions of some generalized Liénard type system under no...
In this paper we deal with the linear two variable functional equation ℎ_0(x,y)f_0(g_0(x,y))+⋅⋅⋅+ℎ...
The work of this thesis explores contact Hamiltonian systems as ageometrical setting to study physic...
A novel family of numerical integration of closed Newton-Cotes quadrature rules is presented which u...
In this paper, we approximate Lagrange multipliers to solve integro differential equations of mixed ...
In this paper we consider rough differential equations with affine boundary conditions. Using invari...
In a fractured rock mass, the existence of discontinuities may generate preferential paths where the...
Consolidation is the gradual reduction in volume of a saturated soil due to drainage of some of the ...
This is a review paper on recent results for different types of generalized ordinary differential eq...
Newton method is a famous method for solving non linear equations numerically. This method is also ...
A method of lines approach to the numerical solution of nonlinear wave equations typified by the reg...
In this paper, we present properties and meaning of the new fundamental, called SEE change. Addition...
In this paper, Anything Goes: The Sonnenschein-Mantel-Debreu theorem (following the work of Sonnench...
In a project at Beihang University different methods to model, simulate and identify nonlinear mecha...
In this paper, we investigate the existence, uniqueness, and stability of the periodic solution for ...
In this paper we study the boundedness of solutions of some generalized Liénard type system under no...
In this paper we deal with the linear two variable functional equation ℎ_0(x,y)f_0(g_0(x,y))+⋅⋅⋅+ℎ...
The work of this thesis explores contact Hamiltonian systems as ageometrical setting to study physic...
A novel family of numerical integration of closed Newton-Cotes quadrature rules is presented which u...
In this paper, we approximate Lagrange multipliers to solve integro differential equations of mixed ...
In this paper we consider rough differential equations with affine boundary conditions. Using invari...
In a fractured rock mass, the existence of discontinuities may generate preferential paths where the...
Consolidation is the gradual reduction in volume of a saturated soil due to drainage of some of the ...
This is a review paper on recent results for different types of generalized ordinary differential eq...
Newton method is a famous method for solving non linear equations numerically. This method is also ...
A method of lines approach to the numerical solution of nonlinear wave equations typified by the reg...
In this paper, we present properties and meaning of the new fundamental, called SEE change. Addition...
In this paper, Anything Goes: The Sonnenschein-Mantel-Debreu theorem (following the work of Sonnench...
In a project at Beihang University different methods to model, simulate and identify nonlinear mecha...
In this paper, we investigate the existence, uniqueness, and stability of the periodic solution for ...