Modelling Lagrangian velocity and acceleration in turbulent flows as infinitely differentiable stochastic processes. Viggiano, B., Friedrich, J., Volk, R., Bourgoin, M., Cal, R., B., & Chevillard, L. Journal of Fluid Mechanics, 900:A27, Cambridge University Press, 4, 2020.
Modelling Lagrangian velocity and acceleration in turbulent flows as infinitely differentiable stochastic processes [link]Website  bibtex   
@article{
 title = {Modelling Lagrangian velocity and acceleration in turbulent flows as infinitely differentiable stochastic processes},
 type = {article},
 year = {2020},
 identifiers = {[object Object]},
 keywords = {homogeneous turbulence,isotropic turbulence,turbulence theory},
 pages = {A27},
 volume = {900},
 websites = {https://www.cambridge.org/core/product/identifier/S0022112020004954/type/journal_article},
 month = {4},
 publisher = {Cambridge University Press},
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 created = {2021-04-09T15:25:02.534Z},
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 last_modified = {2021-04-09T15:25:02.534Z},
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 author = {Viggiano, Bianca and Friedrich, Jan and Volk, Romain and Bourgoin, Mickael and Cal, Raúl Bayoán and Chevillard, Laurent},
 journal = {Journal of Fluid Mechanics}
}

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