Fundamental Structural Constraint of Random Scale-Free Networks

Abstract

We study the structural constraint of random scale-free networks that determines possible combinations of the degree exponent γ and the upper cutoff kc in the thermodynamic limit. We employ the framework of graphicality transitions proposed by [Del Genio and co-workers, Phys. Rev. Lett. 107, 178701 (2011)], while making it more rigorous and applicable to general values of kc. Using the graphicality criterion, we show that the upper cutoff must be lower than kc N1/γ for γ < 2, whereas any upper cutoff is allowed for γ > 2. This result is also numerically verified by both the random and deterministic sampling of degree sequences.