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Title: Data-driven learning of Mori–Zwanzig operators for isotropic turbulence

Journal Article · · Physics of Fluids
DOI:https://doi.org/10.1063/5.0070548· OSTI ID:1874192
ORCiD logo [1]; ORCiD logo [1]; ORCiD logo [1]; ORCiD logo [1]
  1. Los Alamos National Lab. (LANL), Los Alamos, NM (United States)
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Developing reduced-order models for turbulent flows, which contain dynamics over a wide range of scales, is an extremely challenging problem. In statistical mechanics, the Mori–Zwanzig (MZ) formalism provides a mathematically exact procedure for constructing reduced-order representations of high-dimensional dynamical systems, where the effects due to the unresolved dynamics are captured in the memory kernel and orthogonal dynamics. Turbulence models based on MZ formalism have been scarce due to the limited knowledge of the MZ operators, which originates from the difficulty in deriving MZ kernels for complex nonlinear dynamical systems. In this work, we apply a recently developed data-driven learning algorithm, which is based on Koopman's description of dynamical systems and Mori's linear projection operator, on a set of fully resolved isotropic turbulence datasets to extract the Mori–Zwanzig operators. With data augmentation using known turbulence symmetries, the extracted Markov term, memory kernel, and orthogonal dynamics are statistically converged and the generalized fluctuation–dissipation relation can be verified. The properties of the memory kernel and orthogonal dynamics, and their dependence on the choices of observables are investigated to address the modeling assumptions that are commonly used in MZ-based models. A series of numerical experiments are then constructed using the extracted kernels to evaluate the memory effects on prediction. The results show that the prediction errors are strongly affected by the choice of observables and can be further reduced by including the past history of the observables in the memory kernel.

Research Organization:
Los Alamos National Laboratory (LANL), Los Alamos, NM (United States)
Sponsoring Organization:
USDOE National Nuclear Security Administration (NNSA); USDOE Laboratory Directed Research and Development (LDRD) Program
Grant/Contract Number:
89233218CNA000001
OSTI ID:
1874192
Alternate ID(s):
OSTI ID: 1834961
Report Number(s):
LA-UR-21-28283; TRN: US2307113
Journal Information:
Physics of Fluids, Vol. 33, Issue 12; ISSN 1070-6631
Publisher:
American Institute of Physics (AIP)Copyright Statement
Country of Publication:
United States
Language:
English

References (37)

A priori estimation of memory effects in reduced-order models of nonlinear systems using the Mori–Zwanzig formalism
  • Gouasmi, Ayoub; Parish, Eric J.; Duraisamy, Karthik
  • Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, Vol. 473, Issue 2205 https://doi.org/10.1098/rspa.2017.0385
journal September 2017
A Data–Driven Approximation of the Koopman Operator: Extending Dynamic Mode Decomposition journal June 2015
Dynamic mode decomposition of numerical and experimental data journal July 2010
Statistical Mechanics of Nonequilibrium Liquids book January 2007
Renormalized reduced models for singular PDEs journal January 2013
Existence proof for orthogonal dynamics and the Mori-Zwanzig formalism journal December 2005
Renormalized Mori–Zwanzig-reduced models for systems without scale separation journal April 2015
A dynamic subgrid scale model for Large Eddy Simulations based on the Mori–Zwanzig formalism journal November 2017
Hamiltonian Systems and Transformation in Hilbert Space journal May 1931
Non-Markovian out-of-equilibrium dynamics: A general numerical procedure to construct time-dependent memory kernels for coarse-grained observables journal November 2019
Extracting and Modeling the Effects of Small-Scale Fluctuations on Large-Scale Fluctuations by Mori–Zwanzig Projection Operator Method journal February 2020
General Circulation Experiments with the Primitive Equations: i. the Basic Experiment* journal March 1963
Decay of Isotropic Turbulence in the Direct-Interaction Approximation journal January 1964
A dynamic subgrid‐scale eddy viscosity model journal July 1991
Problem reduction, renormalization, and memory journal January 2006
Optimal prediction and the Mori-Zwanzig representation of irreversible processes journal March 2000
Optimal Prediction of Burgers’s Equation journal January 2007
The t -Model as a Large Eddy Simulation Model for the Navier–Stokes Equations journal January 2010
Dynamic structures of the time correlation functions of chaotic nonequilibrium fluctuations journal December 2007
A Statistically-Derived Subgrid-Scale Kinetic Energy Model for the Large-Eddy Simulation of Turbulent Flows journal August 1985
A Numerical Procedure to Evaluate Memory Effects in Non‐Equilibrium Coarse‐Grained Models journal November 2020
Lagrangian-History Closure Approximation for Turbulence journal January 1965
Dynamical Systems of Continuous Spectra journal March 1932
Nonlinear generalized Langevin equations journal November 1973
Reaction analogy based forcing for incompressible scalar turbulence journal September 2018
Transport, Collective Motion, and Brownian Motion journal March 1965
Turbulence: the filtering approach journal May 1992
Optimal prediction and the rate of decay for solutions of the Euler equations in two and three dimensions journal April 2007
Forcing for statistically stationary compressible isotropic turbulence journal November 2010
Derivation of delay equation climate models using the Mori-Zwanzig formalism
  • Falkena, Swinda K. J.; Quinn, Courtney; Sieber, Jan
  • Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, Vol. 475, Issue 2227 https://doi.org/10.1098/rspa.2019.0075
journal July 2019
Non-Markovian closure models for large eddy simulations using the Mori-Zwanzig formalism journal January 2017
Validity of the essential assumption in a projection operator method journal October 2006
Optimal prediction with memory journal June 2002
Data-Driven Learning for the Mori--Zwanzig Formalism: A Generalization of the Koopman Learning Framework journal January 2021
Computing generalized Langevin equations and generalized Fokker-Planck equations journal June 2009
Lagrangian Markovianized field approximation for turbulence journal January 2013
Data-driven model reduction, Wiener projections, and the Koopman-Mori-Zwanzig formalism journal January 2021

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Related Subjects

97 MATHEMATICS AND COMPUTING
turbulence simulations
nonequilibrium statistical mechanics
computational fluid dynamics
turbulent flows
Navier Stokes equations
turbulence theory and modelling
nonlinear systems