Add to ORKGModern theory of dynamical systems is mostly based on nonlinear differential equations and operations. At the same time, the theory of hypernumbers and extrafunctions, a novel approach in functional analysis, has been limited to linear systems. In this paper, nonlinear structures are introduced in spaces of real and complex hypernumbers by ex-tending the concept of a hypernumber. In such a way, linear algebras of extended hy-pernumbers are built. A special topology of conical neighborhoods in these algebras is introduced and studied. It is proved that the space of all extended real hypernumbers is Hausdorff. This provides uniqueness for limits what is very important for analysis of dynamical systems. It is also proved that construction of e...
The cell complex structure is one of the most fundamental structures in topology and combinatorics, ...
We are concerned with the construction of regular spaces and hyper-spaces, and the characteriza-tion...
If X is a topological vector space and T : X → X is a continuous linear operator, then T is said to ...
Modern theory of dynamical systems is mostly based on nonlinear differential equations and operation...
In this paper, we introduce and study semitopological vector spaces. The goal is to provide an effic...
topics. However, only a modest preliminary knowledge is needed. In the first chapter, where we intro...
Dynamical systems are abundant in theoretical physics and engineering. Their understanding, with suf...
This thesis is centered around the study of topological dynamics and analytic topology, as well as a...
This thesis is centered around the study of topological dynamics and analytic topology, as well as a...
This thesis is centered around the study of topological dynamics and analytic topology, as well as a...
This thesis is centered around the study of topological dynamics and analytic topology, as well as a...
A continuous linear operator T : X → X on an infinite dimensional separable topological vector spa...
Abstract. The goal of this paper is to study extension problems of sev-eral continuities in computer...
AbstractA vectorxin a Banach space B is called hypercyclic for a bounded linear operatorT:B→B if the...
The area of dynamical systems where one investigates dynamical properties that can be described in t...
The cell complex structure is one of the most fundamental structures in topology and combinatorics, ...
We are concerned with the construction of regular spaces and hyper-spaces, and the characteriza-tion...
If X is a topological vector space and T : X → X is a continuous linear operator, then T is said to ...
Modern theory of dynamical systems is mostly based on nonlinear differential equations and operation...
In this paper, we introduce and study semitopological vector spaces. The goal is to provide an effic...
topics. However, only a modest preliminary knowledge is needed. In the first chapter, where we intro...
Dynamical systems are abundant in theoretical physics and engineering. Their understanding, with suf...
This thesis is centered around the study of topological dynamics and analytic topology, as well as a...
This thesis is centered around the study of topological dynamics and analytic topology, as well as a...
This thesis is centered around the study of topological dynamics and analytic topology, as well as a...
This thesis is centered around the study of topological dynamics and analytic topology, as well as a...
A continuous linear operator T : X → X on an infinite dimensional separable topological vector spa...
Abstract. The goal of this paper is to study extension problems of sev-eral continuities in computer...
AbstractA vectorxin a Banach space B is called hypercyclic for a bounded linear operatorT:B→B if the...
The area of dynamical systems where one investigates dynamical properties that can be described in t...
The cell complex structure is one of the most fundamental structures in topology and combinatorics, ...
We are concerned with the construction of regular spaces and hyper-spaces, and the characteriza-tion...
If X is a topological vector space and T : X → X is a continuous linear operator, then T is said to ...