Controlling the average degree in random power-law networks

Abstract

We describe a procedure that allows continuously tuning the average degree k of uncorrelated networks with power-law degree distribution p(k). Inn order to do this, we modify the low-k region of p(k), while preserving the large-k tail up to a cutoff. Then, we use the modified p(k) to obtain the degree sequence required to construct networks through the configuration model. We analyze the resulting nearest-neighbor degree and local clustering to verify the absence of k-dependencies. Finally, a further modification is introduced to eliminate the sample fluctuations in the average degree.