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National Repository of Grey Literature

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	Random closed sets and particle processes Stroganov, Vladimír ; Rataj, Jan (advisor) ; Pawlas, Zbyněk (referee) In this thesis we are concerned with representation of random closed sets in Rd with values concentrated on a space UX of locally finite unions of sets from a given class X ⊂ F. We examine existence of their repre- sentations with particle processes on the same space X, which keep invariance to rigid motions, which the initial random set was invariant to. We discuss existence of such representations for selected practically applicable spaces X: we go through the known results for convex sets and introduce new proofs for cases of sets with positive reach and for smooth k-dimensional submanifolds. Beside that we present series of general results related to representation of random UX sets. 1 Detailed record
	Random measurable sets Fojtík, Vít ; Rataj, Jan (advisor) ; Pawlas, Zbyněk (referee) The aim of this thesis is to compare two major models of random sets, the well established random closed sets (RACS) and the more recent and more general random measurable sets (RAMS). First, we study the topologies underlying the models, showing they are very different. Thereafter, we introduce RAMS and RACS and reformulate prior findings about their relationship. The main result of this thesis is a characterization of those RAMS that do not induce a corresponding RACS. We conclude by some examples of such RAMS, including a construction of a translation invariant RAMS. 1 Detailed record
	Random closed sets and particle processes Stroganov, Vladimír ; Rataj, Jan (advisor) ; Pawlas, Zbyněk (referee) In this thesis we are concerned with representation of random closed sets in Rd with values concentrated on a space UX of locally finite unions of sets from a given class X ⊂ F. We examine existence of their repre- sentations with particle processes on the same space X, which keep invariance to rigid motions, which the initial random set was invariant to. We discuss existence of such representations for selected practically applicable spaces X: we go through the known results for convex sets and introduce new proofs for cases of sets with positive reach and for smooth k-dimensional submanifolds. Beside that we present series of general results related to representation of random UX sets. 1 Detailed record
	Probabilistic Analysis of Dempster-Shafer Theory. Part Three Kramosil, Ivan Fulltext: content.csg - PDF Plný tet: v777-99 - PDF Detailed record
	Probabilistic Analysis of Dempster-Shafer Theory. Part Two Kramosil, Ivan Fulltext: content.csg - PDF Plný tet: v749-98 - PDF Detailed record
	Probabilistic Analysis of Dempster-Shafer Theory. Part One Kramosil, Ivan Fulltext: content.csg - PDF Plný tet: v716-97 - PDF Detailed record
	Probabilistic Analysis of the Dempster Combination Rule Kramosil, Ivan Detailed record

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