KO 3.1.17
Bem.4t= BH ) ist die von drfr Blm )
griekjeu Unglidug
( Ap )
=× ( ECM ) ) = rm ( ECM ) )
=Ray von M
⇐ e
EEECMI
definwk Site von P±( N
.Satay
:Frjedes Metroid M get
:P±( M
={ XEREC "
:×(t ) a- rnct ) team ) ,x > 0 }
Bevy
.Si QERECM das Polgedo of In
tedka fih
.•
P±C 141 e- Q ist hleu , dem fir alle IEICM )
and TEEGY ist Int line methane
they in T ,
also
¥H=eEt×⇐t
=ltntl £ key
x= XCI )
.
Es
gier Q a- to ,D* " ( da
fujedeieo
ee ECM ) qlr
:xe=x(k})srm({e})e{ 0,1 } )
'
und de
gaenahljea Puuhh in Q
find glum de charehkvishsda Vektnu
an mabhagjea Regen in M
.•
Also
geuigt es , a aigk , des Q
en geuaelljes Blgbp ish ( d. h
.Q
=cour ( QNZEC " ) oobr Equivalent den ,
class Q uw
gauaahlg taken let )
des folgt as Kor
.4.19
.; a-
DeIpl#futmdnlate2•
D= Seen ( V
, A) Digraph md WERE
← p.
•
De Schutt
-Tnnhhon f
:2V→R ul
f ( x )
: -w ( Smk ) )
is smoked
.Difede "
Sah-4IiDeRaug.TnnhhioaeiestktoidsMistuormwhmouotouuudsubwodnlel.Be_s.NoruivthelundMowtouefinelbleu.oUmSubwodnlantduadkwinn.fiehx.xee@EGaYK.UahhJcXnYm2JeICMmdljl-rmCXnY1.EtgaixJtnJaTxsXwdJaTyeYwlJx.TyeICtyunellJxl-rnlH.lTyl-rnlY1.E
gain mn ]× an ]×E KEXUY
mr ke IC til und |kl=q( KY )
.
] v. ( k 'T× ) a- Y
÷
-ICMI
⇒
1] I + |kY×|£
r⇒
rmHnY/ rmcxuy )
-rnl × )
⇒ rm( Xny ) + if ( Xuy ) term ( X ) + if ( Y ) B-
ka.4.l=
:Metroid
.Polytope find Blgwatooide
.sah-4.IT
:Seen f
:2E→R ( E ended )
woruivl
,
mouton wd subwodnlel
, WERE
,
E=|e
,,
. ., en } und we
,> we
.>
.-2 weu
.fi k maximal ml we
,
> 0
.