LARGE-SCALE STRUCTURE FORMATION IN MIXED DARK-MATTER MODELS WITH A COSMOLOGICAL CONSTANT

We study linear power spectra and formation of large scale structures in flat cosmological models with Lambda greater than or equal to 0 and cold plus hot dark matter components. We refer to these models as mix ed Lambda models (MLM). The hot component consists of massive neutrino s with cosmological density Omega(H) and number of neutrino species as a free parameter. The linearized Einstein-Boltzmann equations for the evolution of the metric and density perturbations are integrated for a set of values of the cosmological parameters. We study MLM models wi th present matter density in the range 0.25 less than or equal to Omeg a(M) less than or equal to 1, dimensionless Hubble constant 0.4 less t han or equal to h less than or equal to 0.7 and the hot dark matter co ntent with a ratio within the limits 0 less than or equal to Omega(H)/ Omega(M) less than or equal to 0.3. For all the considered models we a ssume a scale-invariant primeval spectrum. The density weighted final linear power spectra are normalized to the four year COBE data and hav e been used to constrain the parameter space by a comparison of linear predictions with the current observational data on large scales. The consistency of MLM predictions with the observable data set is best ob tained for models with one species of massive neutrinos and Omega(H)/O mega(M) less than or equal to 0.2. Of the considered linear tests the strongest constraints on Omega(M) that we obtain arise by comparing th e cluster X-ray temperature function with that observed at the present epoch. Consistency with the estimated cluster abundance can be achiev ed for COBE normalized MLM models with Omega(H)/Omega(M) less than or equal to 0.2 and 0.45 less than or equal to Omega(M) less than or equa l to 0.75 for h = 0.5. If h = 0.7 then 0.3 less than or equal to Omega (M) less than or equal to 0.5. These constraints are at 1 sigma level and standard MDM models are clearly ruled out. We note that the range of allowed values for Omega(M), that we obtain for MLM models from lin ear analysis, is also approximately the same range that is needed in o rder to consistently satisfy a variety of independent observational co nstraints.