International audienceWe study two-dimensional rotation-symmetric number- conserving cellular automata working on the von Neumann neighborhood (RNCA). It is known that such automata with 4 states or less are trivial, so we investigate the possible rules with 5 states. We give a full characterization of these automata and show that they cannot be strongly Turing universal. However, we give example of constructions that allow to embed some boolean circuit elements in a 5-states RNCA
In this paper, we investigate non-uniform elementary cellular automata (i.e., one-dimensional cellul...
We introduce a new model of cellular automaton called a one-dimensional number-conserving partition...
International audienceThis paper presents a 1D intrinsically universal cellular automaton with four ...
We present a novel method to study two-dimensional rotation-symmetric number conserving multi-state ...
We study three-dimensional rotation-symmetric cellular automata with the von Neumann neighborhood th...
We study one-dimensional reversible and number-conserving cellular automata (RNCCA) that have both p...
7 pagesInternational audienceReversibility and number-conservation are widely studied physics-like c...
AbstractA reversible cellular automaton (RCA) is a cellular automaton (CA) whose global function is ...
We present a novel representation of 1D reversible and number-conserving cellular automata with four...
AbstractNumber-conserving cellular automata (NCCA) are particularly interesting, both because of the...
A reversible (or injective) cellular automaton (RCA) is a "backward deterministic" CA, i.e., every c...
We present necessary and sufficient conditions for a cellular automaton with a von Neumann neighborh...
In this paper, we introduce a 4 4 -state two-dimensional reversible cellular automaton called P 4 ...
Universality of Cellular Automata (CA) is the ability to develop arbitrary computations, and is view...
The existence of computation-universal one-dimensional cellular automata with seven states per cell ...
In this paper, we investigate non-uniform elementary cellular automata (i.e., one-dimensional cellul...
We introduce a new model of cellular automaton called a one-dimensional number-conserving partition...
International audienceThis paper presents a 1D intrinsically universal cellular automaton with four ...
We present a novel method to study two-dimensional rotation-symmetric number conserving multi-state ...
We study three-dimensional rotation-symmetric cellular automata with the von Neumann neighborhood th...
We study one-dimensional reversible and number-conserving cellular automata (RNCCA) that have both p...
7 pagesInternational audienceReversibility and number-conservation are widely studied physics-like c...
AbstractA reversible cellular automaton (RCA) is a cellular automaton (CA) whose global function is ...
We present a novel representation of 1D reversible and number-conserving cellular automata with four...
AbstractNumber-conserving cellular automata (NCCA) are particularly interesting, both because of the...
A reversible (or injective) cellular automaton (RCA) is a "backward deterministic" CA, i.e., every c...
We present necessary and sufficient conditions for a cellular automaton with a von Neumann neighborh...
In this paper, we introduce a 4 4 -state two-dimensional reversible cellular automaton called P 4 ...
Universality of Cellular Automata (CA) is the ability to develop arbitrary computations, and is view...
The existence of computation-universal one-dimensional cellular automata with seven states per cell ...
In this paper, we investigate non-uniform elementary cellular automata (i.e., one-dimensional cellul...
We introduce a new model of cellular automaton called a one-dimensional number-conserving partition...
International audienceThis paper presents a 1D intrinsically universal cellular automaton with four ...