2017
DOI: 10.1007/s00162-017-0432-2
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De-biasing the dynamic mode decomposition for applied Koopman spectral analysis of noisy datasets

Abstract: The Dynamic Mode Decomposition (DMD)-a popular method for performing data-driven Koopman spectral analysis-has gained increased adoption as a technique for extracting dynamically meaningful spatiotemporal descriptions of fluid flows from snapshot measurements. Often times, DMD descriptions can be used for predictive purposes as well, which enables informed decision-making based on DMD modelforecasts. Despite its widespread use and utility, DMD regularly fails to yield accurate dynamical descriptions when the m… Show more

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Cited by 301 publications
(218 citation statements)
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“…An output of totalleast-squares DMD [22,23] is unbiased even for noisy observations as long as the dynamics are deterministic, but it is biased as a realization of K Ω for the RDS. These inconsistencies in the existing methods are partly revealed in the numerical examples in Section IV.…”
Section: B Observation Noise On Observablesmentioning
confidence: 99%
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“…An output of totalleast-squares DMD [22,23] is unbiased even for noisy observations as long as the dynamics are deterministic, but it is biased as a realization of K Ω for the RDS. These inconsistencies in the existing methods are partly revealed in the numerical examples in Section IV.…”
Section: B Observation Noise On Observablesmentioning
confidence: 99%
“…With subspace DMD, we can naturally conduct a low-rank approximation of dynamics by replacing the compact SVD in Step 3 with a truncated SVD. In contrast, in Algorithm 1 and total-least-squares DMD [22,23], the low-rank approximation is achieved via the truncated proper orthogonal decomposition (POD). Note that there is also a line of research on the low-rank approximation of DMD, such as [24][25][26][27].…”
Section: Compute Compact Svd U Q1 = U Svmentioning
confidence: 99%
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“…In particular, a number of generalizations of the DMD algorithm have recently been proposed with each seeking to address various deciencies of the algorithm. Examples of the recent developments include: establishing an appropriate way of selecting the most important DMD modes (Chen et al 2012;Jovanovic et al 2014), nding an optimal low-order projection basis (Wynn et al 2013), improving the robustness of the method to observation noise (Hemati et al 2015;Wynn et al 2013), establishing a stronger link to Koopman operator (Williams et al 2015) or accounting for input/output systems (Proctor et al 2014).…”
Section: Introductionmentioning
confidence: 99%