Statistical comparison of clouds and star clusters

Abstract

The extent to which the projected distribution of stars in a cluster is due to a large-scale radial gradient, and the extent to which it is due to fractal sub-structure, can be quantified -- statistically -- using the measure Q = m/s. Here m is the normalized mean edge length of its minimum spanning tree (i.e. the shortest network of edges connecting all stars in the cluster) and s is the correlation length (i.e. the normalized mean separation between all pairs of stars). We show how Q can be indirectly applied to grey-scale images by decomposing the image into a distribution of points from which m and s can be calculated. This provides a powerful technique for comparing the distribution of dense gas in a molecular cloud with the distribution of the stars that condense out of it. We illustrate the application of this technique by comparing Q values from simulated clouds and star clusters.