Add to ORKGThe notion of orthogonality for vectors in inner product spaces is simple, interesting and fruitful. When moving to normed spaces, we have many possibilities to extend this notion. Recently the constants which measure the difference between these orthogonalities have been investigated. The usual orthognality in inner product spaces is symmetric. However, Birkhoff orthogonality in normed spaces is not symmetric in general. The norm plane in which Birkhoff orthogonality is symmetric is called a Radon plane. We consider the difference between Birkhoff and isosceles orthogonalities in Radon planes
Let x and y be two unit vectors in a normed plane R 2. We say that x is Birkhoff orthogonal to y if ...
AbstractLet X be a real finite-dimensional normed space with unit sphere SX and let L(X) be the spac...
Abstract We study the homogeneity of isosceles orthogonality, which is one of the most important ort...
The notion of orthogonality for vectors in inner product spaces is simple, interesting and fruitful....
The notion of orthogonality for vectors in inner product spaces is simple, interesting and fruitful....
This paper presents three definitions of orthogonality in normed spaces. Each definition is shown eq...
summary:In this paper we introduce a new type of orthogonality for real normed planes which coincide...
summary:Some characterizations of inner product spaces in terms of Birkhoff orthogonality are given....
In this final project, we study on an orthogonality in real normed spaces in the sense of Birkhoff. ...
AbstractIn this paper we introduce a new geometry constant D(X) to give a quantitative characterizat...
Kikianty and Dragomir in 2008 introduced the p-HH-norms on the Cartesian product of two copies of a...
In this note we discuss the concept of b-orthogonality in 2-normedspaces. We observe in particular t...
AbstractA new orthogonality relation in normed linear spaces which generalizes pythagorean orthogona...
In the present work we study properties of orthogonality in Hilbert spaces and possibilities of exte...
This paper generalizes the special case of the Carlsson orthogonality in terms of the 2-HH norm in r...
Let x and y be two unit vectors in a normed plane R 2. We say that x is Birkhoff orthogonal to y if ...
AbstractLet X be a real finite-dimensional normed space with unit sphere SX and let L(X) be the spac...
Abstract We study the homogeneity of isosceles orthogonality, which is one of the most important ort...
The notion of orthogonality for vectors in inner product spaces is simple, interesting and fruitful....
The notion of orthogonality for vectors in inner product spaces is simple, interesting and fruitful....
This paper presents three definitions of orthogonality in normed spaces. Each definition is shown eq...
summary:In this paper we introduce a new type of orthogonality for real normed planes which coincide...
summary:Some characterizations of inner product spaces in terms of Birkhoff orthogonality are given....
In this final project, we study on an orthogonality in real normed spaces in the sense of Birkhoff. ...
AbstractIn this paper we introduce a new geometry constant D(X) to give a quantitative characterizat...
Kikianty and Dragomir in 2008 introduced the p-HH-norms on the Cartesian product of two copies of a...
In this note we discuss the concept of b-orthogonality in 2-normedspaces. We observe in particular t...
AbstractA new orthogonality relation in normed linear spaces which generalizes pythagorean orthogona...
In the present work we study properties of orthogonality in Hilbert spaces and possibilities of exte...
This paper generalizes the special case of the Carlsson orthogonality in terms of the 2-HH norm in r...
Let x and y be two unit vectors in a normed plane R 2. We say that x is Birkhoff orthogonal to y if ...
AbstractLet X be a real finite-dimensional normed space with unit sphere SX and let L(X) be the spac...
Abstract We study the homogeneity of isosceles orthogonality, which is one of the most important ort...