Non-expansive matrix number systems with bases similar to Jn(1)

Abstract

We study representations of integral vectors in a number system with a matrix base M and vector digits. We focus on the case when M is similar to Jn, the Jordan block of 1 of size n. If M=J2, we classify digit sets of size 2 allowing representation of the whole Z2. For Jn with n≥ 3, it is shown that three digits suffice to represent all of Zn. For bases similar to Jn, at most n digits are required, with the exception of n=1. Moreover, the language of strings representing the zero vector with M=J2 and the digits (0, 1)T is shown not to be context-free, but to be recognizable by a Turing machine with logarithmic memory.

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