References
- Amsallem, David, Matthew J. Zahr, and Charbel Farhat. 2012. “Nonlinear Model Order Reduction Based on Local Reduced-Order Bases.” International Journal for Numerical Methods in Engineering 92 (10): 891–916. doi: 10.1002/nme.
- Baiges, Joan, Ramon Codina, and Sergio Idelsohn. 2013. “Explicit Reduced-Order Models for the Stabilized Finite Element Approximation of the Incompressible Navier–Stokes Equations.” International Journal for Numerical Methods in Fluids 72 (12): 1219–1243. doi: 10.1002/fld.3777.
- Bergmann, M., C. H. Bruneau, and A. Iollo. 2009. “Enablers for Robust POD Models.” Journal of Computational Physics 228 (2): 516–538. doi: 10.1016/j.jcp.2008.09.024.
- Borggaard, Jeff, Traian Iliescu, and Zhu Wang. 2011. “Artificial Viscosity Proper Orthogonal Decomposition.” Mathematical and Computer Modelling 53 (1–2): 269–279. doi: 10.1016/j.mcm.2010.08.015.
- Borggaard, Jeff, Zhu Wang, and Lizette Zietsman. 2016. “A Goal-Oriented Reduced-Order Modeling Approach for Nonlinear Systems.” Computers & Mathematics with Applications 71 (11): 1–15. Elsevier Ltd. doi: 10.1016/j.camwa.2016.01.031.
- Brufau, P., P. García-Navarro, and M. E. Vázquez-Cendón. 2004. “Zero Mass Error Using Unsteady Wetting-Drying Conditions in Shallow Flows Over Dry Irregular Topography.” International Journal for Numerical Methods in Fluids 45 (10): 1047–1082. doi: 10.1002/fld.729.
- Chen, X., I. M. Navon, and S. Akella. 2012. “A Dual-Weighted Trust-Region Adaptive POD 4D-VAR Applied to a Finite-Element Shallow-Water Equations Model on the Sphere.” International Journal for Numerical Methods in Fluids 68 (3): 377–402. doi:10.1002/fld.2198
- Duvigneau, R., and D. Pelletier. 2006. “A Sensitivity Equation Method for Fast Evaluation of Nearby Flows and Uncertainty Analysis for Shape Parameters.” International Journal of Computational Fluid Dynamics 20 (7): 497–512. doi: 10.1080/10618560600910059.
- Gerbeau, Jean-Frédéric, and Damiano Lombardi. 2014. “Approximated Lax Pairs for the Reduced Order Integration of Nonlinear Evolution Equations.” Journal of Computational Physics 265: 246–269. doi: 10.1016/j.jcp.2014.01.047.
- Hongfei, Fu, Wang Hong, and Wang Zhu. 2018. “POD/DEIM Reduced-Order Modeling of Time-Fractional Partial Differential Equations with Applications in Parameter Identification.” Journal of Scientific Computing 74 (1): 220–243. https://arxiv.org/pdf/1606.06798.pdf
- Ijzerman, W. L. 2000. “Signal Representation and Modeling of Spatial Structures in Fluids.” Thesis. University of Twente, Netherland.
- Kikuchi, Ryota, Takashi Misaka, and Shigeru Obayashi. 2016. “Real-Time Prediction of Unsteady Flow Based on POD Reduced-Order Model and Particle Filter.”.” International Journal of Computational Fluid Dynamics 30 (4): 285–306. Taylor & Francis. doi:10.1080/10618562.2016.1198782.
- Lozovskiy, Alexander, Matthew Farthing, Chris Kees, and Eduardo Gildin. 2016. “POD-Based Model Reduction for Stabilized Finite Element Approximations of Shallow Water Flows.” Journal of Computational and Applied Mathematics 302: 50–70. Elsevier B.V. doi: 10.1016/j.cam.2016.01.029.
- Luo, Zhendong, Fei Teng, and Zhenhua Di. 2014. “A POD-Based Reduced-Order Finite Difference Extrapolating Model with Fully Second-Order Accuracy for Non-Stationary Stokes Equations.” International Journal of Computational Fluid Dynamics 28 (6): 428–436. Taylor & Francis. doi: 10.1080/10618562.2014.973407.
- Medeiros, Stephen C., and Scott C. Hagen. 2013. “Review of Wetting and Drying Algorithms for Numerical Tidal Flow Models.” International Journal for Numerical Methods in Fluids 000: 000–000. doi: 10.1002/fld.3668.
- Nigro, P. S. B., M. Anndif, Y. Teixeira, P. M. Pimenta, and P. Wriggers. 2015. “An Adaptive Model Order Reduction with Quasi-Newton Method for Nonlinear Dynamical Problems.” International Journal for Numerical Methods in Engineering 57 (4): 537–554. Springer Berlin Heidelberg. doi: 10.1002/nme.5145.
- Romanowicz, Renata, and Keith J. Beven. 1998. “Dynamic Real-Time Prediction of Flood Inundation Probabilities.” Hydrological Sciences Journal 43 (2): 181–196. doi: 10.1080/02626669809492117.
- San, O., and J. Borggaard. 2015. “Principal Interval Decomposition Framework for POD Reduced-Order Modeling of Convective Boussinesq Flows.” International Journal for Numerical Methods in Fluids 78 (1): 37–62. doi: 10.1002/fld.4006.
- Sirovich, Lawrence. 1987. “Turbulence and the Dynamics of Coherent Structures Part I: Coherent Structures.” Quarterly of Applied Mathematics 45 (3): 561–571. doi: 10.3109/10717544.2013.779332
- Stanko, Zachary P., Scott E. Boyce, and William W. G. Yeh. 2016. “Nonlinear Model Reduction of Unconfined Groundwater Flow Using POD and DEIM.” Advances in Water Resources 97: 130–143. doi: 10.1016/j.advwatres.2016.09.005.
- Ştefânescu, R., and I. M. Navon. 2013. “POD/DEIM Nonlinear Model Order Reduction of an ADI Implicit Shallow Water Equations Model.” Journal of Computational Physics 237: 95–114. doi: 10.1016/j.jcp.2012.11.035.
- Wang, Zhu, Imran Akhtar, Jeff Borggaard, and Traian Iliescu. 2012. “Proper Orthogonal Decomposition Closure Models for Turbulent Flows: A Numerical Comparison.” Computer Methods in Applied Mechanics and Engineering 237–240: 10–26. doi: 10.1016/j.cma.2012.04.015.
- Wang, Yuepeng, Navon I. Michael, Wang Xinyue, and Cheng Yue. 2016. “2D Burgers Equation with Large Reynolds Number Using POD/DEIM and Calibration.” International Journal for Numerical Methods in Fluids 82 (12): 909–931. doi: 10.1002/fld.4249
- Xiao, D., F. Fang, A. G. Buchan, C. C. Pain, I. M. Navon, J. Du, and G. Hu. 2014. “Non-Linear Model Reduction for the Navier–Stokes Equations Using Residual DEIM Method.” Journal of Computational Physics 263: 1–18. doi: 10.1016/j.jcp.2014.01.011.
- Xiao, D., F. Fang, C. C. Pain, and I. M. Navon. 2017. “A Parameterized Non-Intrusive Reduced Order Model and Error Analysis for General Time-Dependent Nonlinear Partial Differential Equations and Its Applications.” Computer Methods in Applied Mechanics and Engineering 317: 868–889. Elsevier B.V. doi: 10.1016/j.cma.2016.12.033.
- Zokagoa, J.-M., and A. Soulaïmani. 2010. “Modeling of Wetting–Drying Transitions in Free Surface Flows Over Complex Topographies.” Computer Methods in Applied Mechanics and Engineering 199 (33): 2281–2304. doi: 10.1016/j.cma.2010.03.023
- Zokagoa, J.-M., and A. Soulaïmani. 2012. “Low-order Modelling of Shallow Water Equations for Sensitivity Analysis Using Proper Orthogonal Decomposition.” International Journal of Computational Fluid Dynamics 26 (5): 275–295. doi: 10.1080/10618562.2012.715153