Scale Invariance of Rich Cluster Abundance: A Possible Test for Models of Structure Formation

Abstract

We investigate the dependence of cluster abundance n(>M,rcl), i.e., the number density of clusters with mass larger than M within radius rcl, on scale parameter rcl. Using numerical simulations of clusters in the CDM cosmogonic theories, we notice that the abundance of rich clusters shows a simple scale invariance such that n[>(rcl/r0)αM, rcl]= n(>M,r0), in which the scaling index α remains constant in a scale range where halo clustering is fully developed. The abundances of scale rcl clusters identified from IRAS are found basically to follow this scaling, and yield α 0.5 in the range 1.5 < rcl < 4 h-1Mpc. The scaling gains further supports from independent measurements of the index α using samples of X-ray and gravitational lensing mass estimates. We find that all the results agree within error limit as: α 0.5 - 0.7 in the range of 1.5 < rcl < 4 h-1Mpc. These numbers are in good consistency with the predictions of OCDM (M=0.3) and LCDM (M+ =1), while the standard CDM model has different behavior. The current result seems to favor models with a low mass density.

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