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Given a positive integer M and
$q \in (1, M+1]$
we consider expansions in base q for real numbers
$x \in [0, {M}/{q-1}]$
over the alphabet
$\{0, \ldots , M\}$
. In particular, we study some dynamical properties of the natural occurring subshift
$(\boldsymbol{{V}}_q, \sigma )$ related to unique expansions in such base q. We characterize the set of
$q \in \mathcal {V} \subset (1,M+1]$
such that
$(\boldsymbol{{V}}_q, \sigma )$
has the specification property and the set of
$q \in \mathcal {V}$
such that
$(\boldsymbol{{V}}_q, \sigma )$
is a synchronized subshift. Such properties are studied by analysing the combinatorial and dynamical properties of the quasi-greedy expansion of q. We also calculate the size of such classes as subsets of
$\mathcal {V}$
giving similar results to those shown by Blanchard [
10
] and Schmeling in [
36
] in the context of
$\beta $
-transformations.
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