Algorithms by Design: Part III—A Novel Normalized Time Weighted Residual Methodology and Design of Optimal Symplectic-Momentum Based Controllable Numerical Dissipative Algorithms for Nonlinear Structural Dynamics
DOI10.1080/15502280802575430zbMath1425.74216OpenAlexW2040604723MaRDI QIDQ3404058
Andrew Hoitink, Siti Ujila Masuri, Kumar K. Tamma, Xiangmin Zhou
Publication date: 5 February 2010
Published in: International Journal for Computational Methods in Engineering Science and Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/15502280802575430
finite elementsnonlinear dynamicstime integrationcomputational dynamicsLMS methods and time levelsymplectic-momentum based controllable numerical dissipation
Finite element methods applied to problems in solid mechanics (74S05) Thin bodies, structures (74K99) Numerical approximation of solutions of dynamical problems in solid mechanics (74H15)
Related Items (8)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Discrete versions of some classical integrable systems and factorization of matrix polynomials
- Nonlinear stability of the time-discrete variational problem of evolution in nonlinear heat conduction, plasticity and viscoplasticity
- The discrete energy-momentum method. Conserving algorithms for nonlinear elastodynamics
- Exact energy-momentum conserving algorithms and symplectic schemes for nonlinear dynamics
- Computational inelasticity
- Lie-Poisson Hamilton-Jacobi theory and Lie-Poisson integrators
- A theory of development and design of generalized integration operators for computational structural dynamics
- A Time Integration Algorithm for Structural Dynamics With Improved Numerical Dissipation: The Generalized-α Method
- A new unified theory underlying time dependent linear first-order systems: a prelude to algorithms by design
- Algorithms by Design: Part II—A Novel Normalized Time Weighted Residual Methodology and Design of a Family of Symplectic-Momentum Conserving Algorithms for Nonlinear Structural Dynamics
- Discrete mechanics and variational integrators
- Algorithms by design with illustrations to solid and structural mechanics/dynamics
- Applicability and evaluation of an implicit self-starting unconditionally stable methodology for the dynamics of structures
- Extension of LMS formulations for L-stable optimal integration methods with U0–V0 overshoot properties in structural dynamics: the level-symmetric (LS) integration methods
- Algorithms by Design: Part I—On the Hidden Point Collocation Within LMS Methods and Implications for Nonlinear Dynamics Applications
- An alpha modification of Newmark's method
- Symplectic-energy-momentum preserving variational integrators
- An energy–momentum conserving algorithm for non-linear hypoelastic constitutive models
- Design, analysis, and synthesis of generalized single step single solve and optimal algorithms for structural dynamics
- The Method of Weighted Residuals and Variational Principles
- On the formulation of high-frequency dissipative time-stepping algorithms for nonlinear dynamics. I: Low-order methods for two model problems and nonlinear elastodynamics
- The time dimension: A theory towards the evolution, classification, characterization and design of computational algorithms for transient/dynamic applications
- On the formulation of high-frequency dissipative time-stepping algorithms for nonlinear dynamics. II: Second-order methods.
This page was built for publication: Algorithms by Design: Part III—A Novel Normalized Time Weighted Residual Methodology and Design of Optimal Symplectic-Momentum Based Controllable Numerical Dissipative Algorithms for Nonlinear Structural Dynamics
