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We develop a method to calculate the column density distribution of the Lya forest for column densities in the range 1012.51014.5 cm~2. The Zeldovich approximation, with appropriate smoothing, is used to compute the density and peculiar velocity elds. The e ect of the latter on absorption proles is discussed, and it is shown to have little e ect on the column density distribution. An approximation is introduced in which the column density distribution is related to a statistic of density peaks (involving its height and rst and second derivatives along the line of sight) in real space. We show that the slope of the column density distribution is determined by the temperature-density relation, as well as the power spectrum, on scales 2 h h Mpc~1. An expression relating the three is given. We Mpc~1 [ k [ 20 nd very good agreement between the column density distribution obtained by applying the Voigt prole tting technique to the output of a full hydrodynamic simulation and that obtained using our approximate method for a test model. This formalism then is applied to study a group of cold dark matter, as well as cold plus hot dark matter, models. We show that the amplitude of the column density distribution depends on the combination of parameters which is not well constrained () b h2)2T 0 ~0.7J H I ~1, by independent observations. The slope of the distribution, on the other hand, can be used to distinguish between di erent models : those with a smaller amplitude and a steeper slope of the power spectrum on small scales give rise to steeper distributions, for the range of column densities that we study. Comparison with high-resolution Keck data is made.
Hui et al. (Wed,) studied this question.
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