Complex network zeta function: Difference between revisions

the transition occurs at <math>\textstyle \alpha = d</math>. The definition of dimension using the complex network zeta function satisfies properties like monotonicity (a subset has a lower or the same dimension as its containing set), stability (a union of sets has the maximum dimension of the component sets forming the union) and Lipschitz invariance <ref name=falconer>K. Falconer., Fractal Geometry: Mathematical Foundations and Applications, Wiley, second edition, 2003</ref>, provided the operations involved change the distances between nodes only by finite amounts as the graph size <math>\textstyle N</math> goes to <math>\textstyle \infty</math>. Algorithms to calculate the complex network zeta function have been presented<ref name="Shankerc">{{cite journal|author=O. Shanker, O.|year=2008|title=Algorithms for Fractal Dimension Calculation|journal=Modern Physics Letters B|volume= 22|pages=459-466}}</ref>.