R. Khalil, D. Hussein, W. Amin
abstract:
Let f be a modulus function, i.e., continuous
strictly increasing function on [0, infinity), such that f
(0) = 0, f (1) = 1, and f
(x+y) \leq f (x) + f (y)
for all x, y in [0, infinity). It is the object of this paper to characterize,
for any Banach space X, extreme points, exposed points, and smooth points of the
unit ball of the metric linear space lf(X),
the space of all sequences (xn), xn in X, n = 1, 2, ... ,
for which the sum f (||xn||) is not
infinite. Further, extreme, exposed, and smooth points of the unit ball of the
space of bounded linear operators on l p, 0 < p < 1, are
characterized.