%0 Journal Article %1 fareed2019incremental %A Fareed, Hiba %A Singler, John R. %D 2019 %J Applied Numerical Mathematics %K 65f30-other-matrix-algorithms 65m15-pdes-ivps-error-bounds 65m60-pdes-ibvps-finite-elements %P 223-233 %R 10.1016/j.apnum.2019.04.020 %T A note on incremental POD algorithms for continuous time data %U https://www.sciencedirect.com/science/article/abs/pii/S0168927419301084 %V 144 %X In our earlier work Fareed et al. (2018) 18, we developed an incremental approach to compute the proper orthogonal decomposition (POD) of PDE simulation data. Specifically, we developed an incremental algorithm for the SVD with respect to a weighted inner product for the discrete time POD computations. For continuous time data, we used an approximate approach to arrive at a discrete time POD problem and then applied the incremental SVD algorithm. In this note, we analyze the continuous time case with simulation data that is piecewise constant in time such that each data snapshot is expanded in a finite collection of basis elements of a Hilbert space. We first show that the POD is determined by the SVD of two different data matrices with respect to weighted inner products. Next, we develop incremental algorithms for approximating the two matrix SVDs with respect to the different weighted inner products. Finally, we show neither approximate SVD is more accurate than the other; specifically, we show the incremental algorithms return equivalent results.

@article{fareed2019incremental, abstract = {In our earlier work Fareed et al. (2018) [18], we developed an incremental approach to compute the proper orthogonal decomposition (POD) of PDE simulation data. Specifically, we developed an incremental algorithm for the SVD with respect to a weighted inner product for the discrete time POD computations. For continuous time data, we used an approximate approach to arrive at a discrete time POD problem and then applied the incremental SVD algorithm. In this note, we analyze the continuous time case with simulation data that is piecewise constant in time such that each data snapshot is expanded in a finite collection of basis elements of a Hilbert space. We first show that the POD is determined by the SVD of two different data matrices with respect to weighted inner products. Next, we develop incremental algorithms for approximating the two matrix SVDs with respect to the different weighted inner products. Finally, we show neither approximate SVD is more accurate than the other; specifically, we show the incremental algorithms return equivalent results.}, added-at = {2021-02-18T03:34:55.000+0100}, author = {Fareed, Hiba and Singler, John R.}, biburl = {https://www.bibsonomy.org/bibtex/2f49738f13ac8a9fc788619f3d0288893/gdmcbain}, doi = {10.1016/j.apnum.2019.04.020}, interhash = {5c32fd6444b03d2ba97778b4c8c171ff}, intrahash = {f49738f13ac8a9fc788619f3d0288893}, journal = {Applied Numerical Mathematics}, keywords = {65f30-other-matrix-algorithms 65m15-pdes-ivps-error-bounds 65m60-pdes-ibvps-finite-elements}, month = oct, pages = {223-233}, timestamp = {2021-02-18T03:36:57.000+0100}, title = {A note on incremental {POD} algorithms for continuous time data}, url = {https://www.sciencedirect.com/science/article/abs/pii/S0168927419301084}, volume = 144, year = 2019 }