EDP Sciences logo
Submit your paper
Search
Menu
All issues Volume 43 / No 1 (February 2025) JNWPU, 43 1 (2025) 149-153 References
Open Access
Issue
JNWPU
Volume 43, Number 1, February 2025
Page(s) 149 - 153
DOI https://doi.org/10.1051/jnwpu/20254310149
Published online 18 April 2025
  1. GONCALVES E, HOUDEVILLE R. Turbulence model and numerical scheme assessment for buffet computations[J]. International Journal for Numerical Methods in Fluids, 2004, 46(11): 1127–1152 [Google Scholar]
  2. CHEN G, LI D, ZHOU Q, et al. Efficient aeroelastic reduced order model with global structural modifications[J]. Aerospace Science and Technology, 2018, 76: 1–13 [Google Scholar]
  3. KERSCHEN G, GOLINVAL J C, VAKAKIS A F, et al. The method of proper orthogonal decomposition for dynamical characterization and order reduction of mechanical systems: an overview[J]. Nonlinear Dynamics, 2005, 41(1/2/3): 147–169 [Google Scholar]
  4. FRESCA S, MANZONI A. POD-DL-ROM: enhancing deep learning-based reduced order models for nonlinear parametrized PDEs by proper orthogonal decomposition[J]. Computer Methods in Applied Mechanics and Engineering, 2022, 388: 114181. [Article] [Google Scholar]
  5. GUO Ziyi, ZHAO Jianfu, LI Kai, et al. Bifurcation analysis of thermocapillary convection based on POD-Galerkin reduced-order method[J]. Chinese Journal of Theoretical and Applied Mechanics, 2022, 54(5): 1186–1198 (in Chinese) [Google Scholar]
  6. ZHANG X, JI T, XIE F. Unsteady flow prediction from sparse measurements by compressed sensing reduced order modeling[J]. Computer Methods in Applied Mechanics and Engineering, 2022, 393: 114800 [Google Scholar]
  7. SCHMID P J. Dynamic mode decomposition and its variants[J]. Annual Review of Fluid Mechanics, 2022, 54(1): 225–254. [Article] [Google Scholar]
  8. SCHILDERS W H A, VORST H A V D, ROMMES J. Model order reduction: theory, research aspects and applications[M]. Berlin: Springer, 2008 [CrossRef] [Google Scholar]
  9. SIMPSON T, DERVILIS N, CHATZI E. Machine learning approach to model order reduction of nonlinear systems via autoencoder and LSTM Networks[J]. Journal of Engineering Mechanics, 2021, 147(10): 04021061 [Google Scholar]
  10. FRANCO N, MANZONI A, ZUNINO P. A deep learning approach to reduced order modelling of parameter dependent partial differential equations[J]. Mathematics of Computation, 2022, 92(340): 483–524 [Google Scholar]
  11. WU P, GONG S, PAN K, et al. Reduced order model using convolutional auto-encoder with self-attention[J]. Physics of Fluids, 2021, 33(7): 077107 [Google Scholar]

Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.

Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.

Initial download of the metrics may take a while.