Add to ORKGAbstract. In this paper, some characterizations of representa-tion for continuous linear functionals on 2k-inner product spaces in terms of best approximations and orthogonalities are given. 1
Kikianty and Dragomir (Math Inequal Appl 13:1–32, 2010)\ud introduced the p−HH norms on the Cartesia...
AbstractA new orthogonality relation in normed linear spaces which generalizes pythagorean orthogona...
In this paper we introduce two mappings associated with the lower and upper semiinner product (.,.)i...
In [6], C. Dierick deals with a small but important collection of norms in the product of a finite n...
AbstractIn an inner product space X, a cone or a linear variety which is generated by a finite numbe...
We prove that a space X is an inner product space if and only if it is true that whenever x, y are ...
Elumalai and R. Vijayaragavan In this paper we established some of the results of the best simul-tan...
Among normal linear spaces, the inner product spaces (i.p.s.) are particularly interesting. Many cha...
AbstractUsing a well-known characterization theorem for best approximations, direct proofs are given...
Let f be an element and S a subset of a normed linear space x. A basic Problem of approximation theo...
AbstractThe present paper deals with several characterization theorems for best approximation in nor...
AbstractWe consider the class of linear mappings, between real or complex inner product spaces, such...
We give estimates for the degree of the best approximation by elements of closed linear subspaces as...
In this paper we introduce two mappings associated with the lower and upper semiinner product (.,.)i...
AbstractOptimal numerical approximation of bounded linear functionals by weighted sums in Hilbert sp...
Kikianty and Dragomir (Math Inequal Appl 13:1–32, 2010)\ud introduced the p−HH norms on the Cartesia...
AbstractA new orthogonality relation in normed linear spaces which generalizes pythagorean orthogona...
In this paper we introduce two mappings associated with the lower and upper semiinner product (.,.)i...
In [6], C. Dierick deals with a small but important collection of norms in the product of a finite n...
AbstractIn an inner product space X, a cone or a linear variety which is generated by a finite numbe...
We prove that a space X is an inner product space if and only if it is true that whenever x, y are ...
Elumalai and R. Vijayaragavan In this paper we established some of the results of the best simul-tan...
Among normal linear spaces, the inner product spaces (i.p.s.) are particularly interesting. Many cha...
AbstractUsing a well-known characterization theorem for best approximations, direct proofs are given...
Let f be an element and S a subset of a normed linear space x. A basic Problem of approximation theo...
AbstractThe present paper deals with several characterization theorems for best approximation in nor...
AbstractWe consider the class of linear mappings, between real or complex inner product spaces, such...
We give estimates for the degree of the best approximation by elements of closed linear subspaces as...
In this paper we introduce two mappings associated with the lower and upper semiinner product (.,.)i...
AbstractOptimal numerical approximation of bounded linear functionals by weighted sums in Hilbert sp...
Kikianty and Dragomir (Math Inequal Appl 13:1–32, 2010)\ud introduced the p−HH norms on the Cartesia...
AbstractA new orthogonality relation in normed linear spaces which generalizes pythagorean orthogona...
In this paper we introduce two mappings associated with the lower and upper semiinner product (.,.)i...