∗ The first and third author were partially supported by National Fund for Scientific Research at the Bulgarian Ministry of Science and Education under grant MM-701/97.A theorem proved by Fort in 1951 says that an upper or lower semi-continuous set-valued mapping from a Baire space A into non-empty compact subsets of a metric space is both lower and upper semi-continuous at the points of a dense Gδ -subset of A. In this paper we show that the conclusion of Fort’s theorem holds under the weaker hypothesis of either upper or lower quasi-continuity. The existence of densely defined continuous selections for lower quasi-continuous mappings is also proved
summary:In this paper we deal with weakly upper semi-continuous set-valued maps, taking arbitrary no...
summary:In this paper we deal with weakly upper semi-continuous set-valued maps, taking arbitrary no...
AbstractFor a set-valued mapping, the relationships between lower semicontinuity, almost lower semic...
Dedicated to the memory of Professor D. Doitchinov Abstract. A theorem proved by Fort in 1951 says t...
AbstractEvery set-valued mapping satisfying an assumption weaker than lower semi-continuity admits a...
In this paper, we extend a theorem of Matejdes on quasicontinuous selections of upper Baire continuo...
Abstract. Fort’s theorem states that if F: X → 2Y is an upper (lower) semicontinuous set-valued mapp...
AbstractFor a set-valued mapping, the relationships between lower semicontinuity, almost lower semic...
AbstractIt is known that the fragmentability of a topological space X by a metric whose topology con...
In this paper, we extend a theorem of Matejdes on quasicontinuous selections of upper Baire continuo...
AbstractThe paper is devoted to a general factorization theorem for “continuous” set-valued mappings...
AbstractLet X and Y be topological spaces, let Z be a metric space, and let f:X×Y→Z be a mapping. It...
AbstractEvery set-valued mapping satisfying an assumption weaker than lower semi-continuity admits a...
AbstractIt is known that the fragmentability of a topological space X by a metric whose topology con...
In this paper we give a sufficient condition for existence of an extension of a lower (upper) semico...
summary:In this paper we deal with weakly upper semi-continuous set-valued maps, taking arbitrary no...
summary:In this paper we deal with weakly upper semi-continuous set-valued maps, taking arbitrary no...
AbstractFor a set-valued mapping, the relationships between lower semicontinuity, almost lower semic...
Dedicated to the memory of Professor D. Doitchinov Abstract. A theorem proved by Fort in 1951 says t...
AbstractEvery set-valued mapping satisfying an assumption weaker than lower semi-continuity admits a...
In this paper, we extend a theorem of Matejdes on quasicontinuous selections of upper Baire continuo...
Abstract. Fort’s theorem states that if F: X → 2Y is an upper (lower) semicontinuous set-valued mapp...
AbstractFor a set-valued mapping, the relationships between lower semicontinuity, almost lower semic...
AbstractIt is known that the fragmentability of a topological space X by a metric whose topology con...
In this paper, we extend a theorem of Matejdes on quasicontinuous selections of upper Baire continuo...
AbstractThe paper is devoted to a general factorization theorem for “continuous” set-valued mappings...
AbstractLet X and Y be topological spaces, let Z be a metric space, and let f:X×Y→Z be a mapping. It...
AbstractEvery set-valued mapping satisfying an assumption weaker than lower semi-continuity admits a...
AbstractIt is known that the fragmentability of a topological space X by a metric whose topology con...
In this paper we give a sufficient condition for existence of an extension of a lower (upper) semico...
summary:In this paper we deal with weakly upper semi-continuous set-valued maps, taking arbitrary no...
summary:In this paper we deal with weakly upper semi-continuous set-valued maps, taking arbitrary no...
AbstractFor a set-valued mapping, the relationships between lower semicontinuity, almost lower semic...
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