Generalized logarithmic scaling for high-order moments of the longitudinal velocity component explained by the random sweeping decorrelation hypothesis

Expressions for the logarithmic variations of the normalized turbulent longitudinal velocity ((u(2p)) over bar (+))(1/p) with normalized distance z/delta from a boundary for high-order (p) moments in the intermediate region of wall bounded flows characterized by thickness delta are derived. The ansatz that ((u(2p)) over bar (+))(1/p) variation in ln(z/delta) originates from a compound effect of random sweeping and -1 power-law scaling in the longitudinal velocity spectrum E-u(k) is discussed, where k is the wavenumber. Using velocity time series sampled above a uniform ice sheet, an E-u(k) similar to k(-1) scaling is confirmed for k z < 1 and k delta > 1. The data were then used to analyze assumptions required for the utility of the random sweeping decorrelation (RSD) hypothesis connecting the k-1 power-law with log-scaling in ((u(2p)) over bar (+))(1/p). It has been found out that while the RSD hypothesis is operationally applicable to scales associated with attached eddies bounded by k z < 1 and kd > 1, significant interactions among high-order turbulent velocity and velocity increments lead to the conclusion that the RSD hypothesis cannot be exactly valid. Its operational utility stems from the observations that some of the interaction terms among the high-order velocity and velocity increments act in opposite directions thereby canceling their additive effects in RSD. Published by AIP Publishing.