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Perturbation theory makes it possible to calculate the probability distribution function (PDF) of the large scale density field in the small variance limit. For top hat smoothing and scale-free Gaussian initial fluctuations, the result depends only on the linear variance, sigmaₗinear, and its logarithmic derivative with respect to the filtering scale - (nₗinear+3) =dlog sigmaₗinear²/dlog L (Bernardeau 1994). In this paper, we measure the PDF and its low-order moments in scale-free simulations evolved well into the nonlinear regime and compare the results with the above predictions, assuming that the spectral index and the variance are adjustable parameters, nₑff and sigmaₑff=sigma, where sigma is the true, nonlinear variance. With these additional degrees of freedom, results from perturbation theory provide a good fit of the PDFs, even in the highly nonlinear regime. The value of nₑff is of course equal to nₗinear when sigma 1, and it decreases with increasing sigma. A nearly flat plateau is reached when sigma 1. In this regime, the difference between nₑff and nₗinear increases when nₗinear decreases. For initial power-spectra with nₗinear=-2, -1, 0, +1, we find nₑff ~ -9, -3, -1, -0. 5 when sigma² ~ 100.
Colombi et al. (Thu,) studied this question.