On the decision problem for quantified probability logics

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Resumo

Let $\mathsf{QPL}^{\mathrm{e}}$ expand the quantifier-free “polynomial” probability logic of [4](R. Fagin et al., 1990)by adding quantifiers over arbitrary events; it can be viewed as a one-sorted elementary language for reasoning about probability spaces. We prove that the $\Sigma_2$-fragment of the $\mathsf{QPL}^{\mathrm{e}}$-theory of finite spaces is hereditarily undecidable. By earlier observations, this implies that $\Pi_2$ is the maximal decidable prefix fragment of $\mathsf{QPL}^{\mathrm{e}}$. Moreover, we obtain similar results for two natural one-sorted logics of probability that emerge from [1](M. Abadi and J. Y. Halpern, 1994).

Sobre autores

Stanislav Speranski

Steklov Mathematical Institute of Russian Academy of Sciences, Moscow, Russia

Autor responsável pela correspondência
Email: katze.tail@gmail.com
Candidate of physico-mathematical sciences, no status

Bibliografia

  1. M. Abadi, J. Y. Halpern, “Decidability and expressiveness for first-order logics of probability”, Inform. and Comput., 112:1 (1994), 1–36
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  4. R. Fagin, J. Y. Halpern, N. Megiddo, “A logic for reasoning about probabilities”, Inform. and Comput., 87:1-2 (1990), 78–128
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  10. R. M. Solovay, R. D. Arthan, J. Harrison, “Some new results on decidability for elementary algebra and geometry”, Ann. Pure Appl. Logic, 163:12 (2012), 1765–1802
  11. С. О. Сперанский, “Квантификация по пропозициональным формулам в вероятностной логике: вопросы разрешимости”, Алгебра и логика, 50:4 (2011), 533–546
  12. S. O. Speranski, “A note on hereditarily $Pi^0_1$- and $Sigma^0_1$-complete sets of sentences”, J. Logic Comput., 26:5 (2016), 1729–1741
  13. S. O. Speranski, “Quantifying over events in probability logic: an introduction”, Math. Structures Comput. Sci., 27:8 (2017), 1581–1600
  14. S. O. Speranski, “An ‘elementary’ perspective on reasoning about probability spaces”, Log. J. IGPL, 2024, jzae042, Publ. online
  15. S. O. Speranski, “Sharpening complexity results in quantified probability logic”, Log. J. IGPL, 2024, jzae114, Publ. online
  16. A. Tarski, A decision method for elementary algebra and geometry, 2nd ed., Univ. of California Press, Berkeley–Los Angeles, CA, 1951, iii+63 pp.

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