The decision problem for some logics for finite words on infinite alphabets

This paper is a follow-up of a previous paper where the logical characterization of Eilenberg, Elgot, and Shepherdson of $n$ary synchronous relations was investigated in the case where the alphabet has infinitely many letters. Here we show that modifying one of the predicate leads to a completely different picture for infinite alphabets though it does not change the expressive power for finite alphabets. Indeed, roughly speaking, being able to express the fact that two words end with the same symbol leads to an undecidable theory, already for the $\Sigma_2$ fragment. Finally, we show that the existential fragment is decidable. Bibl. – 19 titles.