In this paper we study the asymptoic behavior of D-dimensional linear cellular automata over the ring Z sub m . IN the first part of the paper we consider non-surjective cellular automata. We prove that, after a transient phase of length at most [log sub 2 m], the evolution of a linear non-surjective cellular automata F takes place completely within a subspace Y sub F. This result suggests that we can get valuable information on the long term behavior of F by studying its properties when restricted to Y sub F. We prove that such study is possible by showing that the system(Y sub F,F) is topologicaly conjugated to a linear cellular automata F sup * defined over a different ring Z sub m. In the second part of the paper, we study the attractor sets of linear cellular automata. Recently, Kurka[8] has shown that CA can be partitioned into five disjoint classes according to the structure of their attactors. We present a procedure for decidign the membership in Kurka's classes for any linear cellular automata. Our procedure require oly gcd computations involving the coefficients of the local rule associated to the cellular automata.
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机译:在本文中,我们研究了D维线性元胞自动机在环Z sub m上的渐近行为。在本文的第一部分中,我们考虑了非排斥细胞自动机。我们证明,在一个最大长度为[log sub 2 m]的过渡阶段之后,线性非排斥细胞自动机F的演化完全发生在子空间Y sub F内。这一结果表明,我们可以获得关于通过研究F限于Y sub F时的特性来研究F的长期行为。我们通过证明系统(Y sub F,F)在拓扑上与线性单元自动机F sup *定义为拓扑,从而证明了这种研究是可行的不同的环Z sub m。在本文的第二部分中,我们研究了线性元胞自动机的吸引子集。最近,Kurka [8]表明,CA可以根据其行为者的结构分为五个不相交的类。我们提出了一种确定线性细胞自动机的Kurka类成员资格的程序。我们的过程需要oly gcd计算,其中涉及与细胞自动机相关的局部规则的系数。
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