Büchi-like characterizations for Parikh-recognizable omega-languages

Büchi's theorem states that $ω$-regular languages are characterized as languages of the form $\bigcup_i U_i V_i^ω$, where $U_i$ and $V_i$ are regular languages. Parikh automata are automata on finite words whose transitions are equipped with vectors of positive integers, whose sum can be tested for membership in a given semi-linear set. We give an intuitive automata theoretic characterization of languages of the form $U_i V_i^ω$, where $U_i$ and $V_i$ are Parikh-recognizable. Furthermore, we show that the class of such languages, where $U_i$ is Parikh-recognizable and $V_i$ is regular is exactly captured by a model proposed by Klaedtke and Ruess [Automata, Languages and Programming, 2003], which again is equivalent to (a small modification of) reachability Parikh automata introduced by Guha et al. [FSTTCS, 2022]. We finish this study by introducing a model that captures exactly such languages for regular $U_i$ and Parikh-recognizable $V_i$.