Add to ORKGIn the presented paper we study some properties of preponderantly continuous functions and functions satisfying the property A1. For any family F of real-valued functions we define MAXF = {g: max{f,g} ∈ F for all f ∈ F} and MINF = {g: min{f,g} ∈ F for all f ∈ F}. The aim of the paper is to find MINF for two discussed classes of functions
We prove that if f(z) is a continuous real-valued function on R with the properties f(0)= f(1) = 0 ...
Abstract. In 2001, El-Monsef and Nasef have introduced γ-continuous multi-functions and in 2004, Par...
Focussing on the theory (both classical and recent) of monotone multifunctions on a (possibly nonref...
In the present paper, a few different notions of preponderant continuity of a real function are disc...
For a given arithmetical function f : N → N, let\ud F : N → N be defined by F(n) = min{m ≥ 1 : n|f(m...
Abstract For a given arithmetical function f: N → N, let F: N → N be defined by F (n) = min{m ≥ 1: ...
In the article we present definition and some properties of weakly ϱ-upper continuous functions. We ...
We construct a continuous function on [0,111 that orders the set of Max-min functionals on C([0,171)...
A general min-max principle established by Ghoussoub is extended to the case of functionals which ar...
We construct a continuous function on $ [0,1]^n $ that orders the set of Max-min functionals on $ C(...
Extensions of the seminal Ghoussoub's min-max principle [15] to non-smooth functionals given by a lo...
AbstractThe close connection between the maximization operation and nondeterministic computation has...
Abstract. In this paper, we establish an equivalent statement of minimax inequality for a special cl...
The object of this thesis is to extend certain definitions and theorems well known in the theory of ...
Extremes of single and multi-variable functions are problems in which we try to solve maximum or min...
We prove that if f(z) is a continuous real-valued function on R with the properties f(0)= f(1) = 0 ...
Abstract. In 2001, El-Monsef and Nasef have introduced γ-continuous multi-functions and in 2004, Par...
Focussing on the theory (both classical and recent) of monotone multifunctions on a (possibly nonref...
In the present paper, a few different notions of preponderant continuity of a real function are disc...
For a given arithmetical function f : N → N, let\ud F : N → N be defined by F(n) = min{m ≥ 1 : n|f(m...
Abstract For a given arithmetical function f: N → N, let F: N → N be defined by F (n) = min{m ≥ 1: ...
In the article we present definition and some properties of weakly ϱ-upper continuous functions. We ...
We construct a continuous function on [0,111 that orders the set of Max-min functionals on C([0,171)...
A general min-max principle established by Ghoussoub is extended to the case of functionals which ar...
We construct a continuous function on $ [0,1]^n $ that orders the set of Max-min functionals on $ C(...
Extensions of the seminal Ghoussoub's min-max principle [15] to non-smooth functionals given by a lo...
AbstractThe close connection between the maximization operation and nondeterministic computation has...
Abstract. In this paper, we establish an equivalent statement of minimax inequality for a special cl...
The object of this thesis is to extend certain definitions and theorems well known in the theory of ...
Extremes of single and multi-variable functions are problems in which we try to solve maximum or min...
We prove that if f(z) is a continuous real-valued function on R with the properties f(0)= f(1) = 0 ...
Abstract. In 2001, El-Monsef and Nasef have introduced γ-continuous multi-functions and in 2004, Par...
Focussing on the theory (both classical and recent) of monotone multifunctions on a (possibly nonref...