Extreme points, smooth points and noncreasiness of -direct sum of Banach spaces

We characterize the extreme points and smooth points of the unit ball of certain direct sums of Banach spaces. We use these results to characterize noncreasiness and uniform noncreasiness of direct sums, thereby extending results of the second author [S. Saejung, Extreme points, smooth points and no

## Abstract Smooth points of the unit sphere of ORLICZ spaces equipped with LUXEMBURG norm are characterized for a non‐atomic measure as well as for the counting measure. As a corollary, a criterion of smoothness of ORLICZ spaces with LUXEMBURG norm is obtained.

## Abstract The aim of the paper is to give necessary and sufficient conditions under which the set of extreme points of the unit ball of an Orlicz space __L__^ϕ^(μ), equipped with the Luxemburg norm, is closed. Using that description a theorem is given saying when the notions “extremal” and “nice”

agrees with F on &Y, we have that L -G has a zero in U. Otherwise, F is L-inessential in Kau(o, C; L), i.e., there exists G E Ksv (0, C; L) which agrees with F on dU and L -G is zero free on U. Two maps F, G E Ka~r(u,C; L) are homotopic in Kau(D, C; L) written F = G in Ka,y(D, C; L) if there is a co

In this note we prove that if a differentiable function oscillates between y and on the boundary of the unit ball then there exists a point in the interior of the ball in which the differential of the function has norm equal or less than . This kind of approximate Rolle's theorem is interesting beca