Abstract
UDC 514.1
For every
m
≥
2
,
let
ℝ
‖
⋅
‖
m
be
ℝ
m
with a norm
‖
⋅
‖
such that its unit ball has finitely many extreme points. For every
n
≥
2
,
we focus our attention on the description of the sets of extreme and exposed points of the closed unit balls of
ℒ
(
n
ℝ
‖
⋅
‖
m
)
and
ℒ
s
(
n
ℝ
‖
⋅
‖
m
)
, where
ℒ
(
n
ℝ
‖
⋅
‖
m
)
is the space of
n
-linear forms on
ℝ
‖
⋅
‖
m
and
ℒ
s
(
n
ℝ
‖
⋅
‖
m
)
is the subspace of
ℒ
(
n
ℝ
‖
⋅
‖
m
)
formed by symmetric
n
-linear forms. Let
ℱ
=
ℒ
(
n
ℝ
‖
⋅
‖
m
)
or
ℒ
s
(
n
ℝ
‖
⋅
‖
m
)
.
First, we show that the number of extreme points of the unit ball of
ℝ
‖
⋅
‖
m
is greater than
2
m
.
By using this fact, we classify the extreme and exposed points of the closed unit ball of
ℱ
,
respectively. It is shown that every extreme point of the closed unit ball of
ℱ
is exposed. We obtain the results of [Studia Sci. Math. Hungar., <strong>57</strong>, No. 3, 267–283 (2020)] and extend the results of [Acta Sci. Math. Szedged, <strong>87</strong>, No. 1-2, 233–245 (2021) and J. Korean Math., Soc., <strong>60</strong>, No. 1-2, 213–225 (2023)].
Publisher
SIGMA (Symmetry, Integrability and Geometry: Methods and Application)