AbstractLet f:X→Y be continuous where X is a topological space and Y a metric space. Given a set E⊂Y, we ask whether f admits arbitrarily close continuous approximations whose values omit E (see Definition 2). It is shown that if X is paracompact, dimX⩽k, then each continuous mapping X→Rn, n>k, has an arbitrarily close approximation avoiding the product of n given boundary subsets of R.Also, we discuss a related topic consisting in finding conditions under which the approximating mappings do not take values in certain balls. In this connection, we investigate relations between the accuracy of approximations and the radii of omitted balls
The paper presents an approximation theorem, somewhat similar in content to Stone-Weierstrass theore...
We introduce the concept of approximator, i.e. a first order local approximation of a mapping, which...
AbstractThree topologies on function spaces are considered; in increasing order of fineness they are...
AbstractLet f:X→Y be continuous where X is a topological space and Y a metric space. Given a set E⊂Y...
AbstractLet X be a Tychonoff space, C(X) be the space of all continuous real-valued functions define...
AbstractA general approximation property for topological spaces is studied in relation with fixed po...
AbstractLet {Xi:iϵI} be an arbitrary family of spaces, we say that the cartesian product X has the a...
We investigate two approximation relations on a T0 topological space, the n-approximation, and the d...
AbstractFor any upper semicontinuous and compact-valued (usco) mapping F : X→Y from a metric space X...
We study the Complex Unconditional Metric Approximation Property for translation invariant spaces $C...
Let (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic finite mea...
AbstractLet (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic fi...
It is shown that in a Banach space X satisfying mild conditions, for an infinite, independent subset...
AbstractForTa topological space andXa real normed space,Y=C(T,X) denotes the space of continuous and...
In this note continuous directed-complete partial orders with least element (domains) are enriched b...
The paper presents an approximation theorem, somewhat similar in content to Stone-Weierstrass theore...
We introduce the concept of approximator, i.e. a first order local approximation of a mapping, which...
AbstractThree topologies on function spaces are considered; in increasing order of fineness they are...
AbstractLet f:X→Y be continuous where X is a topological space and Y a metric space. Given a set E⊂Y...
AbstractLet X be a Tychonoff space, C(X) be the space of all continuous real-valued functions define...
AbstractA general approximation property for topological spaces is studied in relation with fixed po...
AbstractLet {Xi:iϵI} be an arbitrary family of spaces, we say that the cartesian product X has the a...
We investigate two approximation relations on a T0 topological space, the n-approximation, and the d...
AbstractFor any upper semicontinuous and compact-valued (usco) mapping F : X→Y from a metric space X...
We study the Complex Unconditional Metric Approximation Property for translation invariant spaces $C...
Let (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic finite mea...
AbstractLet (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic fi...
It is shown that in a Banach space X satisfying mild conditions, for an infinite, independent subset...
AbstractForTa topological space andXa real normed space,Y=C(T,X) denotes the space of continuous and...
In this note continuous directed-complete partial orders with least element (domains) are enriched b...
The paper presents an approximation theorem, somewhat similar in content to Stone-Weierstrass theore...
We introduce the concept of approximator, i.e. a first order local approximation of a mapping, which...
AbstractThree topologies on function spaces are considered; in increasing order of fineness they are...