On a class of Rauzy fractals without the finiteness property

Abstract

We present some topological and arithmetical aspects of a class of Rauzy fractals Ra,b related to the polynomials of the form Pa,b(x)=x3-ax2-bx-1, where a and b are integers satisfying -a+1 ≤ b ≤ -2. This class has the property that 0 lies on the boundary of Ra,b. We construct explicit finite automata that recognize the boundaries of these fractals, which allows to establish the number of neighbors of Ra,b. In particular, we prove that if 2a+3b+4 ≤ 0 then Ra,b is not homeomorphic to a topological disk. We also show that the boundary of the set R3,-2 is generated by two infinite iterated function systems.