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The Ptolemy and Zbăganu constants of normed spaces
In every inner product space H the Ptolemy inequality holds: the product of the diagonals of a quadrilateral is less than or equal to the sum of the products of the opposite sides. In other words, ‖ x − y ‖ ‖ z − w ‖ ≤ ‖ x − z ‖ ‖ y − w ‖ + ‖ z − y ‖ ‖ x − w ‖ for any points w , x , y , z in H . It...
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| Published in: | Nonlinear analysis 2010-06, Vol.72 (11), p.3984-3993 |
|---|---|
| Main Authors: | , , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
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| Summary: | In every inner product space
H
the Ptolemy inequality holds: the product of the diagonals of a quadrilateral is less than or equal to the sum of the products of the opposite sides. In other words,
‖
x
−
y
‖
‖
z
−
w
‖
≤
‖
x
−
z
‖
‖
y
−
w
‖
+
‖
z
−
y
‖
‖
x
−
w
‖
for any points
w
,
x
,
y
,
z
in
H
. It is known that for each normed space
(
X
,
‖
⋅
‖
)
, there exists a constant
C
such that for any
w
,
x
,
y
,
z
∈
X
, we have
‖
x
−
y
‖
‖
z
−
w
‖
≤
C
(
‖
x
−
z
‖
‖
y
−
w
‖
+
‖
z
−
y
‖
‖
x
−
w
‖
)
. The smallest such
C
is called the Ptolemy constant of
X
and is denoted by
C
P
(
X
)
. We study the relationships between this constant and the geometry of the space
X
, and hence with metric fixed point theory. In particular, we relate the Ptolemy constant
C
P
to the Zbăganu constant
C
Z
, and prove that if
X
is a Banach space with
C
Z
(
X
)
<
(
1
+
3
)
/
2
, then
X
has (uniform) normal structure and therefore the fixed point property for nonexpansive mappings. We derive general lower and upper bounds for both
C
P
and
C
Z
, and calculate the precise values of these two constants for several normed spaces. We also present a number of conjectures and open problems. |
|---|---|
| ISSN: | 0362-546X 1873-5215 |
| DOI: | 10.1016/j.na.2010.01.030 |