By a novel approach proposed by Luo, the unconventional Hamilton-type variational principle in phase space for elastodynamics of multidegree-of-freedom system is established in this paper. It not only can fully characterize the initial-value problem of this dynamic, but also has a natural symplectic structure. Based on this variational principle, a symplectic algorithm which is called a symplectic time-subdomain method is proposed. A non-difference scheme is constructed by applying Lagrange interpolation polynomial to the time subdomain. Furthermore, it is also proved that the presented symplectic algorithm is an unconditionally stable one. From the results of the two numerical examples of different types, it can be seen that the accuracy a...
The symplectic structure implicit in systems of Hamilton's equations is of great theoretical, and in...
Hamiltonian systems are related to numerous areas of mathematics and have a lot of application branc...
In this paper, a symplectic algorithm is utilized to investigate constrained Hamiltonian systems. Ho...
By a novel approach proposed by Luo, the unconventional Hamilton-type variational principle in phase...
Various systems in nature have a Hamiltonian structure and therefore accurate time integrators for t...
AbstractVarious systems in nature have a Hamiltonian structure and therefore accurate time integrato...
Numerical algorithms based on variational and symplectic integrators exhibit special features that m...
In this paper numerical methods for solving linear Hamiltonian systems are proposed. These schemes a...
Many numerical integrators for mechanical system simulation are created by using discrete algorithms...
We describe a new class of asynchronous variational integrators (AVI) for nonlinear elastodynamics....
The description of the symplectic multi-step algorithm for integration of the equations of motion wi...
The extended framework of Hamilton’s principle provides new rigorous weak variational formalism for ...
From the concept of four-dimensional space and under the four kinds of time limit conditions, some g...
A Hamiltonian structure is presented, which generalizes classical Hamiltonian structure, by assignin...
The purpose of this paper is the derivation of multivalue numerical methods for Hamiltonian problems...
The symplectic structure implicit in systems of Hamilton's equations is of great theoretical, and in...
Hamiltonian systems are related to numerous areas of mathematics and have a lot of application branc...
In this paper, a symplectic algorithm is utilized to investigate constrained Hamiltonian systems. Ho...
By a novel approach proposed by Luo, the unconventional Hamilton-type variational principle in phase...
Various systems in nature have a Hamiltonian structure and therefore accurate time integrators for t...
AbstractVarious systems in nature have a Hamiltonian structure and therefore accurate time integrato...
Numerical algorithms based on variational and symplectic integrators exhibit special features that m...
In this paper numerical methods for solving linear Hamiltonian systems are proposed. These schemes a...
Many numerical integrators for mechanical system simulation are created by using discrete algorithms...
We describe a new class of asynchronous variational integrators (AVI) for nonlinear elastodynamics....
The description of the symplectic multi-step algorithm for integration of the equations of motion wi...
The extended framework of Hamilton’s principle provides new rigorous weak variational formalism for ...
From the concept of four-dimensional space and under the four kinds of time limit conditions, some g...
A Hamiltonian structure is presented, which generalizes classical Hamiltonian structure, by assignin...
The purpose of this paper is the derivation of multivalue numerical methods for Hamiltonian problems...
The symplectic structure implicit in systems of Hamilton's equations is of great theoretical, and in...
Hamiltonian systems are related to numerous areas of mathematics and have a lot of application branc...
In this paper, a symplectic algorithm is utilized to investigate constrained Hamiltonian systems. Ho...