We introduce the notion of a k-synchronized sequence, where k
is an integer larger than 1. Roughly speaking, a sequence of
natural numbers is said to be k-synchronized if its graph is
represented, in base k, by a right synchronized rational
relation. This is an intermediate notion between k-automatic
and k-regular sequences. Indeed, we show that the class of
k-automatic sequences is equal to the class of bounded
k-synchronized sequences and that the class of k-synchronized
sequences is strictly contained in that of k-regular sequences.
Moreover, we show that equality of factors in a k-synchronized
sequence is represented, in base k, by a right synchronized
rational relation. This result allows us to prove that the
separator sequence of a k-synchronized sequence is a
k-synchronized sequence, too. This generalizes a previous
result of Garel, concerning k-regularity of the separator
sequences of sequences generated by iterating a uniform circular
morphism.