Petra Murinová

Murinová, Petra, and Stefania Boffa. 2023. “From Graded Aristotle’s Hexagon to Graded Peterson’s Hexagon of Opposition in Fuzzy Natural Logic.” In Fuzzy Logic and Technology, and Aggregation Operators (EUSFLAT 2023 and AGOP 2023), edited by Sebastia Massanet, Susana Montes, Daniel Ruiz-Aguilera, and Manuel González-Hidalgo, 369–380. Cham: Springer. (0 diagrams)

Boffa, Stefania, Davide Ciucci, and Petra Murinová. 2022. “Comparing Hexagons of Opposition in Probabilistic Rough Set Theory.” In Information Processing and Management of Uncertainty in Knowledge-Based Systems (IPMU 2022, Part 1), edited by Davide Ciucci, Inés Couso, Jesús Medina, Dominik Ślęzak, Davide Petturiti, Bernadette Bouchon-Meunier, and Roland R. Yager, 622–633. Cham: Springer. (0 diagrams)

Boffa, Stefania, Petra Murinová, Vilém Novák, and Petr Ferbas. 2022. “Graded Cubes of Opposition in Fuzzy Formal Concept Analysis.” International Journal of Approximate Reasoning 145: 187–209. (0 diagrams)

Fiala, Karel, and Petra Murinová. 2022. “A Formal Analysis of Generalized Peterson’s Syllogisms Related to Graded Peterson’s Cube.” Mathematics 10: 1–27. (2 diagrams)

Fiala, Karel, and Petra Murinová. 2022. “Modelling of Fuzzy Peterson’s Syllogisms Related to Graded Peterson’s Cube of Opposition.” In Information Processing and Management of Uncertainty in Knowledge-Based Systems (IPMU 2022, Part 1), edited by Davide Ciucci, Inés Couso, Jesús Medina, Dominik Ślęzak, Davide Petturiti, Bernadette Bouchon-Meunier, and Roland R. Yager, 609–621. Cham: Springer. (0 diagrams)

Murinová, Petra, and Vilém Novák. 2022. “On Modeling of Fuzzy Peterson’s Syllogisms Using Peterson’s Rules.” In Information Processing and Management of Uncertainty in Knowledge-Based Systems (IPMU 2022, Part 1), edited by Davide Ciucci, Inés Couso, Jesús Medina, Dominik Ślęzak, Davide Petturiti, Bernadette Bouchon-Meunier, and Roland R. Yager, 647–659. Cham: Springer. (0 diagrams)

Boffa, Stefania, Petra Murinová, and Vilém Novák. 2021. “Graded Polygons of Opposition in Fuzzy Formal Concept Analysis.” International Journal of Approximate Reasoning 132: 128–153. (16 diagrams)

Murinová, Petra. 2021. “An Overview of Graded Structures of Opposition with Intermediate Quantifiers.” In Joint Proceedings of the 19th World Congress of the International Fuzzy Systems Association (IFSA), the 12th Conference of the European Society for Fuzzy Logic and Technology (EUSFLAT), and the 11th International Summer School on Aggregation Operators (AGOP), edited by Radko Mesiar, Marek Z. Reformat, Martin Štěpnička, and Petr Hurtik, 391–398. Paris: Atlantis Press. (0 diagrams)

Boffa, Stefania, Petra Murinová, and Vilém Novák. 2020. “Graded Decagon of Opposition with Fuzzy Quantifier-Based Concept-Forming Operators.” In Information Processing and Management of Uncertainty in Knowledge-Based Systems (IPMU 2020, Part 3), edited by Marie-Jeanne Lesot, Susana Vieira, Marek Z. Reformat, João Paulo Carvalho, Anna Wilbik, Bernadette Bouchon-Meunier, and Roland R. Yager, 131–144. Cham: Springer. (6 diagrams)

Murinová, Petra, and Vilém Novák. 2020. “Graded Cube of Opposition with Intermediate Quantifiers in Fuzzy Natural Logic.” In Information Processing and Management of Uncertainty in Knowledge-Based Systems (IPMU 2020, Part 3), edited by Marie-Jeanne Lesot, Susana Vieira, Marek Z. Reformat, João Paulo Carvalho, Anna Wilbik, Bernadette Bouchon-Meunier, and Roland R. Yager, 145–158. Cham: Springer. (0 diagrams)

Murinová, Petra, and Vilém Novák. 2020. “The Theory of Intermediate Quantifiers in Fuzzy Natural Logic Revisited and the Model of ‘Many.’” Fuzzy Sets and Systems 388: 56–89. (0 diagrams)

Murinová, Petra. 2020. “Graded Structures of Opposition in Fuzzy Natural Logic.” Logica Universalis 14 (4): 495–522. (12 diagrams)

Novák, Vilém, and Petra Murinová. 2019. “A Formal Model of the Intermediate Quantifiers ‘A Few’, ‘Several’ and ‘A Little.’” In Fuzzy Techniques: Theory and Applications (IFSA/NAFIPS 2019), edited by Ralph Baker Kearfott, Ildar Batyrshin, Marek Z. Reformat, Martine Ceberio, and Vladik Kreinovich, 429–441. Cham: Springer. (1 diagram)

Murinová, Petra, Michal Burda, and Viktor Pavliska. 2018. “An Algorithm for Intermediate Quantifiers and the Graded Square of Opposition Towards Linguistic Description of Data.” In Advances in Fuzzy Logic and Technology, Volume 2, edited by Janusz Kacprzyk, Eulalia Szmidt, Slawomir Zadrożny, Krassimir T. Atanassov, and Maciej Krawczak, 592–603. Cham: Springer. (1 diagram)

Murinová, Petra, and Vilém Novák. 2016. “Graded Generalized Hexagon in Fuzzy Natural Logic.” In Information Processing and Management of Uncertainty in Knowledge-Based Systems (IPMU 2016, Part 2), edited by João Paulo Carvalho, Marie-Jeanne Lesot, Uzay Kaymak, Susana Vieira, Bernadette Bouchon-Meunier, and Roland R. Yager, 36–47. Cham: Springer. (2 diagrams)

Murinová, Petra, and Vilém Novák. 2016. “Syllogisms and 5-Square of Opposition with Intermediate Quantifiers in Fuzzy Natural Logic.” Logica Universalis 10 (2–3): 339–357. (5 diagrams)

Murinová, Petra, and Vilém Novák. 2014. “Analysis of Generalized Square of Opposition with Intermediate Quantifiers.” Fuzzy Sets and Systems 242: 89–113. (0 diagrams)

Murinová, Petra, and Vilém Novák. 2013. “The Analysis of the Generalized Square of Opposition.” In Proceedings of the 8th Conference of the European Society for Fuzzy Logic and Technology (EUSFLAT 2013), edited by Gabriella Pasi, Javier Montero, and Davide Ciucci, 252–259. Paris: Atlantis Press. (0 diagrams)