Role of dimensionality in complex networks: Connection with nonextensive statistics

Abstract

Deep connections are known to exist between scale-free networks and non-Gibbsian statistics. For example, typical degree distributions at the thermodynamical limit are of the form P(k) eq-k/, where the q-exponential form eqz [1+(1-q)z]11-q optimizes the nonadditive entropy Sq (which, for q 1, recovers the Boltzmann-Gibbs entropy). We introduce and study here d-dimensional geographically-located networks which grow with preferential attachment involving Euclidean distances through rij-αA \; (αA 0). Revealing the connection with q-statistics, we numerically verify (for d =1, 2, 3 and 4) that the q-exponential degree distributions exhibit, for both q and , universal dependences on the ratio αA/d. Moreover, the q=1 limit is rapidly achieved by increasing αA/d to infinity.