Continuous percolation phase transitions of random networks under a generalized Achlioptas process

Abstract

Using the finite-size scaling, we have investigated the percolation phase transitions of evolving random networks under a generalized Achlioptas process (GAP). During this GAP, the edge with minimum product of two connecting cluster sizes is taken with a probability p from two randomly chosen edges. This model becomes the Erd os-R\'enyi network at p=0.5 and the random network under the Achlioptas process at p=1. Using both the fixed point of s2/s1 and the straight line of s1, where s1 and s2 are the reduced sizes of the largest and the second largest cluster, we demonstrate that the phase transitions of this model are continuous for 0.5 p 1. From the slopes of s1 and (s2/s1)' at the critical point we get the critical exponents β and , which depend on p. Therefore the universality class of this model should be characterized by p also.