Geometry of Cores of Submodular Coherent Upper Probabilities and Possibility Measures

0311992 20240103190401.620090401235959.9 Geometry of Cores of Submodular Coherent Upper Probabilities and Possibility Measures 7 s. 436 cav_un_epca*0311991978-3-540-85026-7Soft Methods for Handling Variability and Imprecision48306-312Berlin HeidelbergSpringer-Verlag2008DuboisDidierLubianoM. AsuncionPradeHenriGilMaria AngelesGrzegorzewskiPrzemyslawHryniewiczOlgierd Geometrie jádra koherentních horních pravděpodobností a posibilit possibility measure coherent upper probability core cav_un_auth*0101141 Kroupa Tomáš UTIA-B Department of Decision Making Theory Ústav teorie informace a automatizace AV ČR, v. v. i. http://library.utia.cas.cz/separaty/2008/MTR/kroupa-geometry%20of%20cores%20of%20submodular%20coherent%20upper%20probabilities%20and%20possibility%20measures.pdf 1M0572 GA MŠk cav_un_auth*0001814 CEZ:AV0Z10750506 We study and review geometrical properties of the set of the prob- abilities dominated by a submodular coherent upper probability (a possibility measure, in particular) on a finite set. We mention that there exists a polynomial algorithm for vertex enumeration. A new upper bound for the number of vertices in case of possibility measures is derived. V práci jsou studovány geometrické vlastnosti množiny pravděpodobnostních měr dominované koherentní horní pravděpodobností na konečné množině. 2009 BA http://hdl.handle.net/11104/0163173 2008 cav_un_epca*0311991 Soft Methods for Handling Variability and Imprecision 978-3-540-85026-7 306 312 Soft Methods for Handling Variability and Imprecision Berlin Heidelberg Springer-Verlag 2008 Advances in Soft Computing 48 Dubois Didier 340 Lubiano M. Asuncion 340 Prade Henri 340 Gil Maria Angeles 340 Grzegorzewski Przemyslaw 340 Hryniewicz Olgierd 340