Critical Dynamics of the Contact Process with Quenched Disorder
Abstract
We study critical spreading dynamics in the two-dimensional contact process (CP) with quenched disorder in the form of random dilution. In the pure model, spreading from a single particle at the critical point λc is characterized by the critical exponents of directed percolation: in 2+1 dimensions, δ = 0.46, η = 0.214, and z = 1.13. Disorder causes a dramatic change in the critical exponents, to δ 0.60, η -0.42, and z 0.24. These exponents govern spreading following a long crossover period. The usual hyperscaling relation, 4 δ + 2 η = d z, is violated. Our results support the conjecture by Bramson, Durrett, and Schonmann [Ann. Prob. 19, 960 (1991)], that in two or more dimensions the disordered CP has only a single phase transition.
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