Titlebook: Cellular Automata and Discrete Complex Systems; 23rd IFIP WG 1.5 Int Alberto Dennunzio,Enrico Formenti,Antonio E. Porre Conference proceedi

意外的成功

Filling Curves Constructed in Cellular Automata with Aperiodic Tilingigate the possibility of using aperiodic tiling inside zones delimited by signals. More precisely, we study curves delineated by CA-constructible functions and prove that most of them can be filled with the NW-deterministic tile set defined by Kari?[.]. The achieved results also hint a new possible

衰老

Turing-Completeness of Asynchronous Non-camouflage Cellular Automataystems. It is unknown, however, to what extent they are able to conduct computation. In this paper, we introduce the so-called ., which means that a cell’s update is insensitive to neighboring states that equal its own state. This property is stronger than the ., which signifies the existence of sta

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Conference proceedings 2017operties; formal languages; symbolic dynamics; tilings; models of parallelism and distributed systems; timing schemes; synchronous versus asynchronous models; phenomenological descriptions; scientific modelling; practical applications...?.

ALLAY

Objektorientierte Bildverarbeitunges must have pairwise balanced local rules. Then, we count the number of pairwise balanced bipermutive Boolean functions and enumerate those which generate orthogonal Latin squares up to . variables, classifying them with respect to their nonlinearity values.

背帶

https://doi.org/10.1007/978-3-322-85116-1regular elements in . when . and . are both finite. Furthermore, we study regular linear CA when . is a vector space over a field .; in particular, we show that every regular linear CA is invertible when . is torsion-free (e.g. when .), and that every linear CA is regular when . is finite-dimensional and . is locally finite with . for all ..

悠然

Darstellung von Segmentierungsergebnissen whereas the remaining two notions seem to be weaker. However, a non-semilinear language is provided that can be accepted by a real-time . with strongly reversible cells. On the other hand, we present a context-free, non-regular language that is accepted by some real-time reversible partitioned ..

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Von Neumann Regular Cellular Automataregular elements in . when . and . are both finite. Furthermore, we study regular linear CA when . is a vector space over a field .; in particular, we show that every regular linear CA is invertible when . is torsion-free (e.g. when .), and that every linear CA is regular when . is finite-dimensional and . is locally finite with . for all ..