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National Repository of Grey Literature

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	Random closed sets Stroganov, Vladimír ; Honzl, Ondřej (advisor) ; Rataj, Jan (referee) Detailed record
	Random closed sets Stroganov, Vladimír ; Honzl, Ondřej (advisor) ; Rataj, Jan (referee) In this bachelor thesis we are concerned with basic knowledge in random set theory. We define here such terms, as capacity functional, se- lection, measurable and integrable multifunction, Castaing representation and Aumann expectation of random closed set. We present Choquet theo- rem, Himmelberg measurability theorem, theorems of properties of selections and expectation. We present also several examples which illustrate the the- ory. 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
	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 closed sets Stroganov, Vladimír ; Honzl, Ondřej (advisor) ; Rataj, Jan (referee) In this bachelor thesis we are concerned with basic knowledge in random set theory. We define here such terms, as capacity functional, se- lection, measurable and integrable multifunction, Castaing representation and Aumann expectation of random closed set. We present Choquet theo- rem, Himmelberg measurability theorem, theorems of properties of selections and expectation. We present also several examples which illustrate the the- ory. 1 Detailed record
	Random closed sets Stroganov, Vladimír ; Honzl, Ondřej (advisor) ; Rataj, Jan (referee) Detailed record

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