Approximations from Subspaces of C0(X)

We say that a normed linear space X is a R(1) space if the following holds: If Y is a closed subspace of finite codimension in X and every hyperplane containing Y is proximinal in X then Y is proximinal in X. In this paper we show that any closed subspace of c 0 is a R(1) space. ## 1999 Academic Pr

A HAUSDORFF locally convex space is said to be c,-barrelled (respectively cu-barrelled) if each sequence in the dual space t h a t converges weakly to 0 (res!,r:ctively t h a t is weakly ?.~oundecl), is equicontinuous. It is proved that if a c,,-barrelled space E has dual E' weakly sequentially comp

In this paper we consider the problem of best approximation in ' n p ; 15p41: If h p ; 15p51; denotes the best ' p -approximation of the element h 2 R n from a proper affine subspace where h n 1 is a best uniform approximation of h from K; the so-called strict uniform approximation. Our aim is to p

## Abstract We give a generalization of the Stone–Weierstrass property for subalgebras of __C__ (__X__), with __X__ a completely regular Hausdorff space. In particular, we study in this paper some subalgebras of __C__~0~(__X__), with __X__ a locally compact Hausdorff space, provided with weighted n

We determine the exact order of best approximation by polynomials and entire functions of exponential type of functions like . \*, : (x)= |x| \* exp(&A |x| &: ). In particular, it is shown that E(. \*, : , P n , L p (&1, 1))tn &(2\*p+:p+2)Â2 p(1+:) \_ exp(&(1+: &1 )(A:) 1Â(1+:) cos :?Â2(1+:) n :Â(1+