AbstractAn algebra of subsets of a normal topological space containing the open sets is considered and in this context the uniform exhaustivity and uniform regularity for a family of additive functions are studied. Based on these results the Cafiero convergence theorem with the Dieudonné type conditions is proved and in this way also the Nikodým–Dieudonné convergence theorem is obtained
AbstractLet f:R→R be an additive function. We consider the following statement: if f can by covered ...
AbstractWe prove that modular spaces Lρ have the uniform Kadec–Klee property w.r.t. the convergence ...
AbstractIn this paper we are concerned with the regularity in Morrey spaces for weak solutions of a ...
AbstractLet Ω be a regular domain in the complex plane C, Ω≠C. Let Gb(Ω) be the linear space over C ...
It is proved that sense preserving continuous mappings f : D → Rn of a domain D in Rn, n > 2, satisf...
We discuss the question of extending homeomorphism between closed subsets of the Cantor discontinuum...
In this paper, we prove some tripled fixed point theorems in fuzzy normed spaces. Our results improv...
AbstractThe most general subset theorem for the covering dimension for arbitrary topological spaces ...
AbstractIf X is a completely regular space it is proved that (i) υX is Lindelöf Σ if and only if the...
AbstractLet Pn denote the set of all algebraic polynomials of degree at most n with real coefficient...
AbstractWe prove that the generalized Trudinger inequalities into exponential and double exponential...
AbstractWe consider completely regular Hausdorff spaces. In this paper we investigate the space of p...
AbstractSince the work of Roper and Suffridge in 1995, there has been considerable interest in const...
AbstractWe generalize Ostrowski inequality for higher order derivatives, by using a generalized Eule...
AbstractIn this paper, we define and study some subclasses of analytic functions by using the concep...
AbstractLet f:R→R be an additive function. We consider the following statement: if f can by covered ...
AbstractWe prove that modular spaces Lρ have the uniform Kadec–Klee property w.r.t. the convergence ...
AbstractIn this paper we are concerned with the regularity in Morrey spaces for weak solutions of a ...
AbstractLet Ω be a regular domain in the complex plane C, Ω≠C. Let Gb(Ω) be the linear space over C ...
It is proved that sense preserving continuous mappings f : D → Rn of a domain D in Rn, n > 2, satisf...
We discuss the question of extending homeomorphism between closed subsets of the Cantor discontinuum...
In this paper, we prove some tripled fixed point theorems in fuzzy normed spaces. Our results improv...
AbstractThe most general subset theorem for the covering dimension for arbitrary topological spaces ...
AbstractIf X is a completely regular space it is proved that (i) υX is Lindelöf Σ if and only if the...
AbstractLet Pn denote the set of all algebraic polynomials of degree at most n with real coefficient...
AbstractWe prove that the generalized Trudinger inequalities into exponential and double exponential...
AbstractWe consider completely regular Hausdorff spaces. In this paper we investigate the space of p...
AbstractSince the work of Roper and Suffridge in 1995, there has been considerable interest in const...
AbstractWe generalize Ostrowski inequality for higher order derivatives, by using a generalized Eule...
AbstractIn this paper, we define and study some subclasses of analytic functions by using the concep...
AbstractLet f:R→R be an additive function. We consider the following statement: if f can by covered ...
AbstractWe prove that modular spaces Lρ have the uniform Kadec–Klee property w.r.t. the convergence ...
AbstractIn this paper we are concerned with the regularity in Morrey spaces for weak solutions of a ...
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