On a problem of Erdös in combinatorial geometry [Elektronische Ressource] / Tobias Gerken

technische_universitat_munchen

Découvre YouScribe en t'inscrivant gratuitement

Je m'inscris

Obtenez un accès à la bibliothèque pour le consulter en ligne
En savoir plus

61 pages

English

Obtenez un accès à la bibliothèque pour le consulter en ligne
En savoir plus

A propos
Informations
Extrait

Sujets

Mathematics

Informations

Publié par	technische_universitat_munchen
Publié le	01 janvier 2006
Nombre de lectures	25
Langue	English
Poids de l'ouvrage	1 Mo

Extrait

Dr
Ric
d
Prag
genehmigten
at

T
er
V
J
he
h
UnivProf
in
hen
u
hnisc
trum

die
erzita
f
hec
andiger
h

der
n
akult
V
F
J
ur
tereb
r
der
binatorial
Dr
d
ec
ersit

ersit
M
Mathematik
d
en
v
at
s
ollst

a
P
Ab
New
Dissertation
k
c
at
er
v
at
unc
Dissertation
c
orsitzender
os
Dr
akult
ersit
Mathematik
h
f
ert
Com
ufer
Mathematik
Dissertation
Zen
UnivProf
T
P
Geometry
Gritzmann
hnisc
T
hnisc
Ji
n
r
F

h

ec
am
M
Problem
druc
ork
M
i
unc
Karlo
hen
a
zur
e
Erlangung
c
des
b
eingereic
am
ademisc
anos
hen
ac
M
Ph
eines
Y
Doktors
wurde
at
y
Naturwissensc
Die
haften
hriftlic
r
Beurteilung
r
angenommen
T
he
On
of
Erd
der
der
Univ
hen
Pr
atou
sek
Univ
T
Univ
ersit
USA
Univ
tu
unc
Prof

hien
Prof

eter

urgen
der
Grades
ak
at
hen
ec
ur
on
Gerk
obias
hen
Univwn
the
set
e
ex
and
ot
wn
e
p
v
lso
a
sense
c
con

o
p
onvex
oin
question
pr
w
the
the
v
n
empt
os
is
hexagon
sets
binatorial
n
e
and
try
n
tly
hexagon
e
et
f

the
er
in
n
n
e
sition
ertex
or
con
lane
ertex
a
that
gon

tains
that
con
n
The
v
in
replaced
there
op
con
longtanding
ertex
whether
of
geome
osition
v
o
o
p
suien
general
kno
v
large
is
this
ev
o
p
as
hexagon
p
W
e
answ
ts
v
emptyexagon
in
general
amativ
solv
W
o
o
y
o
in
ery
p
the
p
tains
hole
v
con
set
f
six
con
oblem
ex
i
a
i
con
conjecture
an
b
y
form
v
a
hexagon
en
result
ask
sharp
ex
s
com
that
without
exist
an
e
y
o
w
v
i
d
a
In
thesis
e
roblem
pr
tains
o
ts
v
gon
gon
the
d
set
n
in
con
its
a
in
e
terior
in
Suc
n
h
ex
a
It
conuration
kno
is
ts
called
ery
ex
of
empty
oin
c
i
ev
Abstract
Erd
ed
in

po
con
an
po
an
that
the
tain
set
yc
that
set
fac
be

an
is
it
tain
mpt
tain
ex
that
con
that
set
sho
the
the
from
ts
ery
oblem
Cases

of

Com

In

t
f

oundations

Chapter

Geometry

List
Individual
S
Discussion
duction

M

v

from

i

binatorial

Cases

y

Problem

tro

tatemen
erview
of
the
and
o

ain
Elemen
Chapter

F
Cases
Related

ten
Abstract
Figures

Result
tary
W

ork
Cases

Bibliograph

kno

wledgemen

ts
Cases

Chapter
and

Pro

of

of
Cases
Theorem

Cases

Cases
Con
ts

iii
The
The
The
The
and
The
and
The
Pro
Ov
Ac

j

Case

Com

with
Case
Case

Case

Case
cases

Case
for

with

with

T
with
the

with

Observ
Case

Cases
Deition

Case
j
Cases

with

Notation

Case

Basic

Cases
Case

Notation

binatorial

t
Figures

Case

Notation

the

ation
QR

T

Sector

x

T

Degenerate
T

with

Cases

Example

for

with

Example

Klein

of

Sub

Cases
with

Case

t

Observ

Cases

Case
Case

Observ

with
Case

v

The

The

The

The

The

The

The

The

The

The

The

The

The

The

The

ation

ation

The

PQ
The

WX
XY
The

and

and

Listoin

that
Case
t

Case
with

on

with
e

f
o
Case
with

n
Example
n
v

ex
Rule

Deition

Rule

R

A
Application

o

f

n
v

con
a

hexagon

n
d
y
no
ull

R

hexagon
Rule
Case

OF
p

a

con
Pro
no
with
m

o
f

of

ex
FIGURES

Rules
Rule

A

R

R

Example

of

set
t

Case
t

i

ts

con
with
v

h

empt

vi
LIST
a

with

po
the
and
ex

ts
no
con
eigh
has
The
tains

The
The
The
The