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Connectedness of number theoretic tilings. (English) Zbl 1162.11366

Summary: Let \(T = T(A,D)\) be a self-affine tile in \(\mathbb R^n\) defined by an integral expanding matrix \(A\) and a digit set \(D\). In connection with canonical number systems, we study connectedness of \(T\) when \(D\) corresponds to the set of consecutive integers \(\{0, 1, \dots , |\det(A)|-1\}\). It is shown that in \(\mathbb R^3\) and \(\mathbb R^4\), for any integral expanding matrix \(A, T(A,D)\) is connected. We also study the connectedness of Pisot dual tilings which play an important role in the study of \(\beta\)-expansion, substitution and symbolic dynamical system. It is shown that each tile generated by a Pisot unit of degree \(3\) is arcwise connected. This is naturally expected since the digit set consists of consecutive integers as above. However surprisingly, we found families of disconnected Pisot dual tiles of degree \(4\). Also we give a simple necessary and sufficient condition for the connectedness of the Pisot dual tiles of degree \(4\). As a byproduct, a complete classification of the \(\beta\)-expansion of \(1\) for quartic Pisot units is given.

MSC:

11K16 Normal numbers, radix expansions, Pisot numbers, Salem numbers, good lattice points, etc.
11A67 Other number representations
11R06 PV-numbers and generalizations; other special algebraic numbers; Mahler measure
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