The approximate deconvolution Leray reduced order model (ADL-ROM) uses spatial filtering to increase the ROM stability, and approximate deconvolution to increase the ROM accuracy. In the under-resolved numerical simulation of convection-dominated flows, ADL-ROM was shown to be significantly more stable than the standard ROM and more accurate than the Leray ROM. In this paper, we equip ADL-ROM with a new van Cittert AD operator and prove a priori error bounds for both the AD operator and the ADL-ROM. To our knowledge, these are the first numerical analysis results for approximate deconvolution in a ROM context. We illustrate these numerical analysis results in the numerical simulation of convection-dominated flows.
Moore, I., Sanfilippo, A., Ballarin, F., Iliescu, T., A Priori Error Bounds for the Approximate Deconvolution Leray Reduced Order Model, <<NUMERICAL METHODS FOR PARTIAL DIFFERENTIAL EQUATIONS>>, 2025; 41 (6): e70044-N/A. [doi:10.1002/num.70044] [https://hdl.handle.net/10807/322876]
A Priori Error Bounds for the Approximate Deconvolution Leray Reduced Order Model
Sanfilippo, Anna;Ballarin, Francesco
;
2025
Abstract
The approximate deconvolution Leray reduced order model (ADL-ROM) uses spatial filtering to increase the ROM stability, and approximate deconvolution to increase the ROM accuracy. In the under-resolved numerical simulation of convection-dominated flows, ADL-ROM was shown to be significantly more stable than the standard ROM and more accurate than the Leray ROM. In this paper, we equip ADL-ROM with a new van Cittert AD operator and prove a priori error bounds for both the AD operator and the ADL-ROM. To our knowledge, these are the first numerical analysis results for approximate deconvolution in a ROM context. We illustrate these numerical analysis results in the numerical simulation of convection-dominated flows.
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