Simulation of ideal material blocks using cellular automata
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Springer Nature B.V.
Abstract
We consider deterministic and probabilistic
cellular automata to study and describe certain types of
patterns in idealized material blocks. We have partic-
ular interest in patterns similar to fractures. The inter-
nal structure of these material blocks is assumed to be
unknown and probabilistic cellular automata are used
to obtain distributions for the referred internal struc-
ture. We consider the 1D case. Certain deterministic
elementary rules are identified as elementary ideal frac-
ture rules and the probabilistic rules are introduced as
probabilistic interpolation of these elementary rules.
The initial conditions are obtained from the visible bor-
ders of the surface (2D block). Therefore, each visible
edge is giving additional information and a probabilis-
tic fracture type pattern. Different methods to combine
these patterns, into a final one, are discussed. Moreover,
we introduce refinement techniques of the CA rules
to improve the probabilities distributions. This refine-
ment process may consider prescribed behaviour or
empirical data, and, therefore, the CA rules behaviour
becomes adjustable.
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Citation
Correia Ramos, C., El Bouziani, N., Tlemçani, M. et al. Simulation of ideal material blocks using cellular automata. Nonlinear Dyn 111, 22381–22397 (2023).