关于子移位和无限词的复杂性

Be'eri Greenfeld, Carlos Gustavo Moreira, Efim Zelmanov
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引用次数: 0

摘要

我们描述了直到渐近等价性的子转移复杂性函数的特征。每个非周期性函数的复杂度函数都是递减的、亚乘的,并且至少是线性增长的。我们反过来证明,满足这些条件的每个函数都渐近等价于循环子移位的复杂度函数,等价于循环无限词。我们的构造是明确的,在本质上是算法性的,在哲学上是基于构造某些 "整数康托集",其 "间隙 "对应于零块。我们还证明了每一个非递减的子乘法函数都与最小子移位的复杂度函数渐近等价,但有线性误差项。
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On the complexity of subshifts and infinite words
We characterize the complexity functions of subshifts up to asymptotic equivalence. The complexity function of every aperiodic function is non-decreasing, submultiplicative and grows at least linearly. We prove that conversely, every function satisfying these conditions is asymptotically equivalent to the complexity function of a recurrent subshift, equivalently, a recurrent infinite word. Our construction is explicit, algorithmic in nature and is philosophically based on constructing certain 'Cantor sets of integers', whose 'gaps' correspond to blocks of zeros. We also prove that every non-decreasing submultiplicative function is asymptotically equivalent, up a linear error term, to the complexity function of a minimal subshift.
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