Invariant measure for double base expansions

Abstract

Given a pair Q=(q0,q1)∈(1,∞)2 with q0+q1 q0q1, a sequence (ci)∈0,1∞ is called a Q-expansion of x if<br/>equation*<br/>x=Σi=1∞ciqc1·s qci.<br/>equation*<br/>We primarily study the dynamical properties of the greedy and lazy maps, which are the piecewise-linear maps on the interval IQ=[0,\,1/(q1-1)] defined by the corresponding algorithms for Q-expansions. <br/>We show that the greedy and lazy maps each of which has a unique absolutely continuous invariant probability measure, equivalent to the Lebesgue measure on the intervals<br/>equation*<br/>[0,q0q1)and(q1q0(q1-1)-1,1q1-1],<br/>equation*<br/>respectively. <br/>Furthermore, the corresponding dynamical systems are exact on IQ. <br/>As a dynamical consequence, under the stronger condition q0+q1>q0q1 the set of points having unique Q-expansions has Lebesgue measure zero, and almost every x∈ IQ admits a continuum of Q-expansions.