The content explores the decidable nature of Sturmian words' first-order theory over Presburger arithmetic. It highlights the use of a general adder to recognize addition in Ostrowski numeration systems, leading to automatic reproval and new results about Sturmian words.
The paper extends results on quadratic numbers to all Sturmian characteristic words, proving their decidability. It showcases how classical theorems about Sturmian words can now be automatically proven by theorem-provers in seconds. The study also reveals potential applications and outlines a more general theorem that encompasses previous results.
Furthermore, it introduces #-binary coding and #-Ostrowski representations to encode continued fractions and real numbers uniquely. The content emphasizes the ω-regularity and bijectivity of these encodings, ensuring accurate representation and decoding capabilities for various mathematical structures.
Overall, the article delves into the intricate world of Sturmian words, providing insights into their decidability and expanding on novel encoding techniques for precise numerical representations.
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