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Название: On the Universality of Geometrical and Transport Exponents of Rigidity Percolation
Авторы: Knackstedt M.A., Sahimi M.
Journal of Statistical Physics, Vol. 69, Nos. 3/4, 1992. p. 887-895.
We develop a three-parameter position-space renormalization group method and investigate the universality of geometrical and transport exponents of rigidity (vector) percolation in two dimensions. To do this, we study site-bond percolation in which sites and bonds are randomly and independently occupied with probabilities s and b, respectively. The global flow diagram of the renormalization transformation is obtained which shows that the geometrical exponents of the rigid clusters in both site and bond percolation belong to the same universality class, and possibly that of random (scalar) percolation. However, if we use the same renormalization transformation to calculate the critical exponents of the elastic moduli of the system in bond and site percolation, we find them to be very different (although the corresponding values of the correlation length exponent are the same). This indicates that the critical exponent of the elastic moduli of rigidity percolation may not be universal, which is consistent with some of the recent numerical simulations.