TY - GEN
T1 - The Blurred Drinker Paradox
T2 - 40th Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2025
AU - Kirst, Dominik
AU - Zeng, Haoyi
N1 - Publisher Copyright:
© 2025 IEEE.
PY - 2025/1/1
Y1 - 2025/1/1
N2 - In the setting of constructive reverse mathematics, we analyse the downward Löwenheim-Skolem (DLS) theorem of first-order logic, stating that every infinite model has a countable elementary submodel. Refining the well-known equivalence of the DLS theorem to the axiom of dependent choice (DC) over classical base theories, our constructive approach allows for several finer logical decompositions: Just assuming countable choice (CC), the DLS theorem is equivalent to the conjunction of DC with a newly identified fragment of the excluded middle (LEM) that we call the blurred drinker paradox (BDP). Further without CC, the DLS theorem is equivalent to the conjunction of BDP with similarly blurred weakenings of DC and CC. Independently of their connection with the DLS theorem, we also study BDP and the blurred choice axioms on their own, for instance by showing that BDP is LEM without a contribution of Markov's principle and that blurred DC is DC without a contribution of CC. The paper is hyperlinked with an accompanying Coq development.
AB - In the setting of constructive reverse mathematics, we analyse the downward Löwenheim-Skolem (DLS) theorem of first-order logic, stating that every infinite model has a countable elementary submodel. Refining the well-known equivalence of the DLS theorem to the axiom of dependent choice (DC) over classical base theories, our constructive approach allows for several finer logical decompositions: Just assuming countable choice (CC), the DLS theorem is equivalent to the conjunction of DC with a newly identified fragment of the excluded middle (LEM) that we call the blurred drinker paradox (BDP). Further without CC, the DLS theorem is equivalent to the conjunction of BDP with similarly blurred weakenings of DC and CC. Independently of their connection with the DLS theorem, we also study BDP and the blurred choice axioms on their own, for instance by showing that BDP is LEM without a contribution of Markov's principle and that blurred DC is DC without a contribution of CC. The paper is hyperlinked with an accompanying Coq development.
KW - Constructive reverse mathematics
KW - Coq
KW - Dependent choice
KW - Drinker paradox
KW - Löwenheim-Skolem theorem
UR - https://www.scopus.com/pages/publications/105020016557
U2 - 10.1109/LICS65433.2025.00073
DO - 10.1109/LICS65433.2025.00073
M3 - Conference contribution
AN - SCOPUS:105020016557
T3 - Proceedings - Symposium on Logic in Computer Science
SP - 926
EP - 940
BT - Proceedings - 2025 40th Annual ACM/IEEE Symposium on Logic in Computer Science, LICS 2025
PB - Institute of Electrical and Electronics Engineers
Y2 - 23 June 2025 through 26 June 2025
ER -