Items where Author is "Gyenis, Zalán"
Group by: Item Type | No Grouping Jump to: Preprint | Conference or Workshop Item Number of items: 17. PreprintWronski, Leszek and Gyenis, Zalán (2024) How to serve two epistemic masters. [Preprint] Szabó, László E. and Gömöri, Márton and Gyenis, Zalán (2023) Questionable and Unquestionable in Quantum Mechanics. [Preprint] Gil Sanchez, Michał and Gyenis, Zalán and Wronski, Leszek (2022) Probability and symmetric logic. [Preprint] Gil Sanchez, Michał and Gyenis, Zalán and Wronski, Leszek (2022) Nonclassical probability, convex hulls, and Dutch Books. [Preprint] Rédei, Miklós and Gyenis, Zalán (2021) The Maxim of Probabilism -- with special regard to Reichenbach. [Preprint] Gyenis, Zalán and Wronski, Leszek (2020) Admissibility and Bayesian direct inference: no HOPe against ubiquitous defeaters. [Preprint] Gyenis, Zalán and Rédei, Miklós and Brown, William (2018) The modal logic of Bayesian belief revision. [Preprint] Gyenis, Zalán (2018) On the modal logic of Jeffrey conditionalization. [Preprint] Gyenis, Zalán (2018) Finite Jeffrey logic is not finitely axiomatizable. [Preprint] Gyenis, Zalán (2018) Standard Bayes logic is not finitely axiomatizable. [Preprint] Gyenis, Zalán and Rédei, Miklós (2017) Common cause completability of non-classical probability spaces. [Preprint] Rédei, Miklós and Gyenis, Zalán (2015) General properties of general Bayesian learning. [Preprint] Gyenis, Zalán and Rédei, Miklós and Hofer-Szabó, Gábor (2015) Conditioning using conditional expectations: The Borel-Kolmogorov Paradox. [Preprint] Rédei, Miklós and Gyenis, Zalán (2013) Can Bayesian agents always be rational? A principled analysis of consistency of an Abstract Principal Principle. [Preprint] Gyenis, Zalán and Rédei, Miklós (2010) Characterizing common cause closed probability spaces. [Preprint] Conference or Workshop ItemGyenis, Zalán and Rédei, Miklós (2016) The Bayes Blind Spot of a finite Bayesian Agent is a large set. In: UNSPECIFIED. Gyenis, Zalán and Rédei, Miklós (2012) Defusing Bertrand's Paradox. In: UNSPECIFIED. |