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It is proved that the following conditions are equivalent: (a) f is an almost everywhere continuous function on $ℝ^{m}$ ; (b) f = g + h, where g,h are strongly quasicontinuous on $ℝ^{m}$ ; (c) f = c + gh, where c ∈ ℝ and g,h are strongly quasicontinuous on $ℝ^{m}$ .

On some separation axioms and -closure

D. Janković (1980)

Matematički Vesnik

On some subclasses of Darboux functions

J. Jastrzębski, Jacek Jędrzejewski, Tomasz Natkaniec (1991)

Fundamenta Mathematicae

On some subspaces of the Helly space

W. F. Pfeffer (1976)

Colloquium Mathematicae

On some test spaces in dimension theory

Ali Fora (1981)

Fundamenta Mathematicae

On some weak conditions of commutativity in common fixed point theorems.

Imdad, M., Khan, M.S., Sessa, S. (1988)

International Journal of Mathematics and Mathematical Sciences

On some weak monomorphisms and weak epimorphisms of pro-HTop*.

I. Pop (1996)

Revista Matemática de la Universidad Complutense de Madrid

Related to Shape Theory, in a previous paper (1992) we studied weak monomorphisms and weak epimorphisms in the category of pro-groups. In this note we give some intrinsic characterizations of the weak monomorphisms and the weak epimorphisms in pro-HTop* in the case when one of the two objects of such a morphism is a rudimentary system.

On some weakened forms of continuity for multifunctions

V. Popa (1984)

Matematički Vesnik

On somewhat fuzzy semicontinuous functions

G. Thangaraj, Ganesan Balasubramanian (2001)

Kybernetika

In this paper the concept of somewhat fuzzy semicontinuous functions, somewhat fuzzy semiopen functions are introduced and studied. Besides giving characterizations of these functions, several interesting properties of these functions are also given. More examples are given to illustrate the concepts introduced in this paper.

On spaces which have the shape of compact metric spaces

Tadashi Watanabe (1979)

Fundamenta Mathematicae

On spaces with binary normal subbase

Andrzej Szymański (1982)

Colloquium Mathematicae

On spaces with the ideal convergence property

Jakub Jasinski, Ireneusz Recław (2008)

Colloquium Mathematicae

Let I ⊆ P(ω) be an ideal. We continue our investigation of the class of spaces with the I-ideal convergence property, denoted (I). We show that if I is an analytic, non-countably generated P-ideal then (I) ⊆ s₀. If in addition I is non-pathological and not isomorphic to $I_{b}$ , then (I) spaces have measure zero. We also present a characterization of the (I) spaces using clopen covers.

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On some maps concerning $g α$ -open sets.

On some operation on sets of mappings

On some problems of Borsuk

On some properties of the spaces of almost continuous functions.

On some representations of almost everywhere continuous functions on $ℝ^{m}$

On some separation axioms and -closure

On some subclasses of Darboux functions

On some subspaces of the Helly space

On some test spaces in dimension theory

On some weak conditions of commutativity in common fixed point theorems.

On some weak monomorphisms and weak epimorphisms of pro-HTop*.

On some weakened forms of continuity for multifunctions

On somewhat fuzzy semicontinuous functions

On spaces which have the shape of compact metric spaces

On spaces with binary normal subbase

On spaces with the ideal convergence property

On stationary sets for certain generalizations of continuity

On Stone extensions of homotopic maps

On strong convergence of multivalued maps

On strongly continuous and completely continuous mappings

Currently displaying 1481 – 1500 of 2509