Abstract
There is a lack of high precision results for turbulence. Here we present a non-equilibrium thermodynamical approach to the turbulent cascade and show that the entropy generation \(\varDelta S_{tot}\) of the turbulent cascade fulfills in high precision the rigorous integral fluctuation theorem \(\langle e^{-\varDelta S_{tot}} \rangle _{u(\cdot )} = 1\). To achieve this result the turbulent cascade has to be taken as a stochastic process in scale, for which Markov property is given and for which an underlying Fokker-Planck equation in scale can be set up. For one exemplary data set we show that the integral fluctuation theorem is fulfilled with an accuracy better than \(10^{-3}\). Furthermore, we show that other basic turbulent features are well taking into account like the third order structure function or the skewness of the velocity increments. Open image in new window
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