Add to ORKGLet X be an infinite dimensional F-normed space and r a positive number such that the closed ball B_r(X) of radius r is properly contained in X. For a bounded subset A of X, the Hausdorff measure of noncompactness gamma(A) of A is the infimum of all $\eps >0$ such that A has a finite $\eps$-net in X. A retraction R of B_r(X) onto its boundary is called k-ball contractive if $\gamma(RA) \le k \gamma(A)$ for each subset A of B_r(X). The main aim of this talk is to give examples of regular F-normed ideal spaces in which there is a 1-ball contractive retraction or, for any $\eps>0$, a $(1+ \eps)$-ball contractive retraction with positive lower Hausdorff measure of noncompactness
AbstractConsider the isometric property (P): the restriction to the unit ball of every bounded linea...
AbstractA completely regular Hausdorff space X is called retractive if there is a retraction from βX...
It is known that if m >= 3 and B is any ball in C-m with respect to some norm, say parallel to.paral...
Let X be an infinite dimensional F-normed space and r a positive number such that the closed ball B_...
Assume X is an infinite dimensional F-normed space and let r be a positive number such that the clos...
AbstractAssume X is an infinite dimensional F-normed space and let r be a positive number such that ...
A retraction $R$ from the closed unit ball of a Banach space $X$ onto its boundary is called $k$-b...
n this paper we consider the Wo´sko problem ([20]) of evaluating, in an infinite-dimensional Banach...
In this paper we consider the Wośko problem of evaluating, in an infinite-dimensional Banach space ...
In this paper for any epsilon > 0 we construct a new proper k-ball-contractive retraction of the ...
A normed space X is said to have the ball-covering property (BCP, for short) if its unit sphere can ...
AbstractSome ways to obtain upper and lower bounds for measures of noncompactness of retractions ont...
ABSTRACT. A characterization for a continuous linear functional to be con-tinuous on the ball topolo...
For any infinite dimensional Banach space there exists a lipschitzian retraction of the closed unit ...
Natural Science Foundation of China [10771175]By a ball-covering B of a Banach space X, we mean that...
AbstractConsider the isometric property (P): the restriction to the unit ball of every bounded linea...
AbstractA completely regular Hausdorff space X is called retractive if there is a retraction from βX...
It is known that if m >= 3 and B is any ball in C-m with respect to some norm, say parallel to.paral...
Let X be an infinite dimensional F-normed space and r a positive number such that the closed ball B_...
Assume X is an infinite dimensional F-normed space and let r be a positive number such that the clos...
AbstractAssume X is an infinite dimensional F-normed space and let r be a positive number such that ...
A retraction $R$ from the closed unit ball of a Banach space $X$ onto its boundary is called $k$-b...
n this paper we consider the Wo´sko problem ([20]) of evaluating, in an infinite-dimensional Banach...
In this paper we consider the Wośko problem of evaluating, in an infinite-dimensional Banach space ...
In this paper for any epsilon > 0 we construct a new proper k-ball-contractive retraction of the ...
A normed space X is said to have the ball-covering property (BCP, for short) if its unit sphere can ...
AbstractSome ways to obtain upper and lower bounds for measures of noncompactness of retractions ont...
ABSTRACT. A characterization for a continuous linear functional to be con-tinuous on the ball topolo...
For any infinite dimensional Banach space there exists a lipschitzian retraction of the closed unit ...
Natural Science Foundation of China [10771175]By a ball-covering B of a Banach space X, we mean that...
AbstractConsider the isometric property (P): the restriction to the unit ball of every bounded linea...
AbstractA completely regular Hausdorff space X is called retractive if there is a retraction from βX...
It is known that if m >= 3 and B is any ball in C-m with respect to some norm, say parallel to.paral...