Add to ORKGNew upper and lower bounds for the p-angular distance in normed\ud linear spaces are given. Some of the obtained upper bounds are better than the\ud corresponding results due to L. Maligranda recently established in the paper\ud [Simple norm inequalities, Amer. Math. Monthly, 113(2006), 256-260]
Some new inequalities for convex functions defined on convex subsets in linear spaces\ud with applic...
AbstractIn this paper the author has studied the Alexandrov problem of area preserving mappings in l...
By d(X,Y) we denote the (multiplicative) Banach-Mazur distance be-tween two normed spaces X and Y. L...
New upper and lower bounds for the p-angular distance in normed linear spaces are given. Some of th...
AbstractIn this paper we present a new characterization of inner product spaces related to the p-ang...
AbstractWe give some exact formulas and some estimates for the distance to a polyhedron in a normed ...
The notion of angles is known in a vector space equipped with an inner product, but not well establi...
We survey problems and results from combinatorial geometry in normed spaces, concentrating on proble...
The Euclidean distance between two points P,Q of the Euclidean n-dimensional space En is a real valu...
summary:We study best approximation in $p$-normed spaces via a general common fixed point principle....
Some sharp discrete inequalities in normed linear spaces are obtained.\ud New reverses of the genera...
AbstractIn this paper we analyze the existence of points of a subset S of a linear space X where the...
AbstractIn this paper, we obtain a better estimate for the norm of inverses of Euclidean distance ma...
Abstract. In this paper we study the behaviour of two functions which can be defined in normed space...
In this paper we establish various inequalities between the operator norm and the numerical radius ...
Some new inequalities for convex functions defined on convex subsets in linear spaces\ud with applic...
AbstractIn this paper the author has studied the Alexandrov problem of area preserving mappings in l...
By d(X,Y) we denote the (multiplicative) Banach-Mazur distance be-tween two normed spaces X and Y. L...
New upper and lower bounds for the p-angular distance in normed linear spaces are given. Some of th...
AbstractIn this paper we present a new characterization of inner product spaces related to the p-ang...
AbstractWe give some exact formulas and some estimates for the distance to a polyhedron in a normed ...
The notion of angles is known in a vector space equipped with an inner product, but not well establi...
We survey problems and results from combinatorial geometry in normed spaces, concentrating on proble...
The Euclidean distance between two points P,Q of the Euclidean n-dimensional space En is a real valu...
summary:We study best approximation in $p$-normed spaces via a general common fixed point principle....
Some sharp discrete inequalities in normed linear spaces are obtained.\ud New reverses of the genera...
AbstractIn this paper we analyze the existence of points of a subset S of a linear space X where the...
AbstractIn this paper, we obtain a better estimate for the norm of inverses of Euclidean distance ma...
Abstract. In this paper we study the behaviour of two functions which can be defined in normed space...
In this paper we establish various inequalities between the operator norm and the numerical radius ...
Some new inequalities for convex functions defined on convex subsets in linear spaces\ud with applic...
AbstractIn this paper the author has studied the Alexandrov problem of area preserving mappings in l...
By d(X,Y) we denote the (multiplicative) Banach-Mazur distance be-tween two normed spaces X and Y. L...