Between two timest p and andt p+1 distant fromδtand for some k∈Z/L tot, we have bX ϵ β(tp+1, k) =e − δt Tk,β bX ϵ β(tp, k) + s 2bGϵ L(k)2 Tk,β ˆ tp+1 tp e − tp+1 −s Tk,β dcW(s, k)

Numerical scheme For the sake of completeness, let us present the numerical scheme adapted from [77] that we use to perform exact in law numerical simulations of the dynamics (44)

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The spatio-temporal statistical structure of the turbulent dissipation field and its stochastic representation as a Gaussian Multiplicative Chaos

physics.flu-dyn · 2026-04-07 · unverdicted · novelty 5.0

Turbulent dissipation is modeled as a spatio-temporal Gaussian Multiplicative Chaos and tested against Navier-Stokes simulations.

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The spatio-temporal statistical structure of the turbulent dissipation field and its stochastic representation as a Gaussian Multiplicative Chaos physics.flu-dyn · 2026-04-07 · unverdicted · none · ref 4
Turbulent dissipation is modeled as a spatio-temporal Gaussian Multiplicative Chaos and tested against Navier-Stokes simulations.

Between two timest p and andt p+1 distant fromδtand for some k∈Z/L tot, we have bX ϵ β(tp+1, k) =e − δt Tk,β bX ϵ β(tp, k) + s 2bGϵ L(k)2 Tk,β ˆ tp+1 tp e − tp+1 −s Tk,β dcW(s, k)

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