Relaxation processes on self-similar structures, in which the approach to equilibrium is considered as a random walk, are examined. The diffusion process on these structures is equivalent to an anomalous diffusion on hierarchical models. Based on this dynamical analogy, it is argued that self-similar structures can be regarded as a class of models with hierarchically constrained dynamics. © 1991.
Eduardo Roman, H., Giona, M. (1991). Hierarchically constrained dynamics on self-similar structures. JOURNAL OF NON-CRYSTALLINE SOLIDS, 131-133(1), 207-209 [10.1016/0022-3093(91)90301-L].
Hierarchically constrained dynamics on self-similar structures
Eduardo Roman H.;
1991
Abstract
Relaxation processes on self-similar structures, in which the approach to equilibrium is considered as a random walk, are examined. The diffusion process on these structures is equivalent to an anomalous diffusion on hierarchical models. Based on this dynamical analogy, it is argued that self-similar structures can be regarded as a class of models with hierarchically constrained dynamics. © 1991.
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