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International Journal of Parallel, Emergent and Distributed Systems Volume 33, 2018 - Issue 3: Logics for unconventional computing. Guest Editor: Andrew Schumann
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Original Articles

Logics to formalise p-adic valued probability and their applications

Angelina Ilić StepićMathematical Institute of the Serbian Academy of Sciences and Arts, Belgrade, Serbia.Correspondence[email protected]
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Zoran OgnjanovićMathematical Institute of the Serbian Academy of Sciences and Arts, Belgrade, Serbia.View further author information
Pages 257-275 | Received 19 Nov 2017, Accepted 14 Dec 2017, Published online: 05 Jan 2018

References

  • Cassels JWS. Local fields. London: Cambridge University Press; 1986.
  • Cassels JWS, Fronlich A. Algebraic number theory. London: Academic Press; 1967.
  • Hasse H. Number theory. Belin: Springer; 1980.
  • De Grande-De N, Kimpe AY. Khrennikov, Non-Archimedean laplace transform. Bull Belgian Math Soc -- Simon Stevin. 1996;3:225–237.
  • Khrennikov AYu. p-adic valued distibutions in mathematical physics. Dordrecht: Kluwer Academic Publishers; 1994.
  • Khrennikov AY. Mathematical methods of the non-Archimedean physics. Uspekhi Mat Nauk. 1990;45(4):79–110.
  • Vladimirov V, Volovich I, Zelenov E. The spectral theory in the p-adic quantum mehanics. Izvestia Akad Nauk SSSR Ser Mat. 1990;54(2):275–302.
  • Albeverio S, Khrennikov AY. Representation of the weyl group in spaces of square integrable functions with respect to p-adic valued gaussian distributions. J Phys A. 1996;29:5515–5527.
  • Albeverio S, Cianci R, Khrennikov AY. A representation of quantum field Hamiltonians in a p-adic Hilbert space. Theor Math Phys. 1997;112(3):355–374.
  • Khrennikov AYu. Non-Arcimedean analysis: quantum paradoxes, dynamical systems and biological models. Dordreht: Kluwer Academic Publishers; 1997.
  • Khrennikov AYu. p-adic quantum mehanics with p-adic valued functions. J Math Phys. 1991;32(4):932–937.
  • Khrennikov A. Toward theory of p-adic valued probabilities. Stud Logic Grammar Rhetoric. 2008;14(27):137–154.
  • Khrennikov AYu. Interpretations of probability. Berlin: Walter de Gruyter; 2009.
  • Ilić Stepić A, Ognjanović Z, Ikodinović N, et al. p-adic probability logic. Math Logic Q. 2012;58(4–5):263–280.
  • Ilić Stepić A, Ognjanović Z, Ikodinović N. Conditional p-adic probability logic. Int J Approximate Reasoning. 2014;55(9):1843–1865.
  • Ilić Stepić A, Ognjanović Z. Logics for reasoning about processes of thinking with information coded by p-adic numbers. Stud Logica. 2015;103:145–174.
  • Fagin R, Halpern J, Megiddo N. A logic for reasoning about probabilities. Inf Comput. 1990;87(1–2):78–128.
  • Ilić Stepić A. A logic for reasoning about qualitative probability. Publications de l’institute Mathematique Nouvele Serie. 2010;87:97–108.
  • Nilsson N. Probabilistic logic. Artif Intell. 1986;28:71–87.
  • Ikodinović N, Ognjanović Z. A logic with coherent conditional probabilities. Symbolic and quantitative approaches to reasoning with uncertainty. Vol. 3571, Lecture notes in computer science. Germany: Springer; 2005. p. 726–736.
  • Ikodinović N, Rašković M, Marković Z, et al. Measure logic. Vol. 4724, Lecture notes in computer science (LNCS/LNAI). Germany: Springer; 2007. p. 128–138.
  • Ikodinović N, Rašković M, Marković Z, et al. Logics with generalized measure operators. J Multiple-Valued Logic Soft Comput. 2013;20(5–6):527–555.
  • Milošević M, Ognjanović Z. A first-order conditional probability logic. Logic J IGPL. 2012;20(1):235–253.
  • Milošević M, Ognjanović Z. A first-order conditional probability logic with iterations. Publications de L’Institute Matematique. 2013;93(107):19–27.
  • Ognjanović Z, Rašković M. Some probability logic with new types of probability operators. J Logic Comput. 1999;9(2):181–195.
  • Ognjanović Z, Ikodinović N. A logic with higher order conditional probabilities. Publications de l’institute Mathematique Nouvele Serie. 2007;82:141–154.
  • Ognjanović Z, Rašković M. Some first-order probability logics. Theor Comput Sci. 2000;247:191–212.
  • Ognjanović Z, Marković Z, Rašković M. Completeness theorem for a logic with imprecise and conditional probabilities. Publications de L’Institute Matematique (Beograd). 2005;78(92):35–49.
  • Rašković M. Classical logic with some probability operators. Publications de l’institut mathematique, Nouvelle série. 1993;53(67):1–3.
  • Ognjanović Z, Rašković M, Marković Z. Probability logics. Zbornik Radova Subseries Logic Comput Sci. 2009;12(20):35–111.
  • Djordjervić R, Rašković M, Ognjanović Z. Completeness theorem for propositional probabilistic models whose measures have only finite ranges. Arch Math Logic. 2004;43:557–563.
  • Milošević M, Ognjanović Z. A first-order conditional probability logic. Logic J IGPL. 2012;20(1):235–253.
  • Ognjanović Z, Rašković M, Marković Z. Probability logics: probability-based formalization of uncertain reasoning. Belgrade: Springer; 2016.
  • Marković Z, Ognjanović Z, Rašković M. A probabilistic extension of intuitionistic logic. Math Logic Q. 2003;49(4):415–424.
  • Ognjanović Z, Perović A, Rašković M. Logic with the qualitative probability operator. Logic J IGPL. 2008;16(2):105–120.
  • Rašković M, Marković Z, Ognjanović Z. A logic with approximate conditional probabilities that can model default reasoning. Int J Approximate Reasoning. 2008;49:52–66.
  • Doder D, Ognjanović Z. Probabilistic logics with independence and confirmation. Stud Logica. 2017;105:943–969.
  • Schumann A. Non-Arcimedean fuzzy and probability logic. J Appl Non-Classical Logics. 2008;18(1):29–48.
  • Schumann A. p-adic multiple-validity and p-adic valued logical calculi. J Multiple-valued Logic Soft Comput. 2007;13(1–2):29–60.
  • Albeverio S, Khrennikov AYu, Kloeden PE. Memory retieval as p-adic dynamical system. BioSystems. 1999;49:105–115.
  • Khrennikov A. Human subconscious as a p-adic dynamical system. J Theor Biol. 1998;193:179–196.
  • Khrennikov AYu. p-adic discrete dynamical systems and collective behaviour of information states in cognitive models. Discrete Dyn Nat Soc. 2000;5:59–69.
  • Schumann A. p-Adic valued logical calculi in simulations of the slime mould behaviour. J Appl Non-Classical Logics. 2015;25(2):125–139.
  • Schumann A, Adamatzky A. The double-slit experiment with Physarum polycephalum and p-adic valued probabilities and fuzziness. Int J General Syst. 2015;44(3):392–408.
  • Schumann A. Reflexive games and non-Arcimedean probabilities. P-adic Numbers, Ultrametric Anal Appl. Jan 2014;6(1):66–79.
  • Khrennikov A, Basieva I. Quantum (-like) decision making: on validity of the Aumann theorem. International Symposium on Quantum Interaction: Springer, Cham; 2014. p. 105–118.
  • Monna A, Springer T. Integration non-Archimedienne. Indag Math. 1963;25:634–653.

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