Interplay of choice and topology in percolation on mediation-driven attachment networks

Abstract

We investigate bond percolation on mediation-driven attachment (MDA) networks under the generalized Achlioptas process, where M>1 candidate bonds are sampled and the one that minimizes the resulting cluster size is selected the best-of-M rule. This framework offers a systematic approach to investigate how network topology and choice mechanisms jointly shape percolation behavior. We analyze the effects of the degree exponent ω and the choice parameter M on the critical point tc and the critical exponents (β,α,γ), which define universality classes and obey the Rushbrooke inequality α + 2β + γ ≥ 2. Using entropy, the order parameter, and their derivatives (representing specific heat and susceptibility respectively), we show that both tc and the universality class depend only weakly on ω but strongly on M, while the Rushbrooke inequality remains valid throughout. For M=2, the order parameter varies continuously without a clear order-disorder transition. By contrast, M=3 and M=4 display explosive percolation that still corresponds to a continuous phase transition, with M=4 producing a significantly sharper and clearer order-disorder transition. This sharpening is traced to an enhanced powder-keg effect at larger M, underscoring the entropic origin of explosive percolation.

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