KO 2.4.18
fs-LThr
↳ enlist
's :ferment
-f ( rain )
val to
11
f WHY
-floater )
Le8
:to
floats 'll
-floats 'll
--vdlft
ttsev
:sed
,
t #
is
'Def.2.ae
: Sei D=(
V, At D- graph .Fur
is
' e Vleft 89$
) EAin
Schnitt
in D .fils fu Sgt
EVs E is'
,
te s
', so
lift Janis
'I
in
s-t-sdw.tt
. Tnr meIf left
u
(
dm ' C is'll
dieu-kapan.tn
des Schilt .←q→
SchiltLevinas
In einem Nettwerk(
D=CHAI
,u
)
we s , t EVqtr f-
jedea
s - t -This f
ER:
undfur
jedea s - t - Schilt C
'
, EA :
vallfl
⇐ uKil
Bens
: fiCi
=8-
'l
is'I
,
sef
',
tf f
' .-
Lem . 2.8 ⇒
vaelfl
--floats 'll
-florist )
- -
⇐
ult
')
70 ElBeu.2.is
: Das Problem in evenDigraphs
uh
bile
Boge. gun- Itu even s - t - Klattwin . weka
/
wetiwelengecidh
tufinder
,ist NP - sdw
; des
gilt soga
Schonfr
des
Pullen
, even S - t -
Schiff
uhwah . wel milk Bogen an
finder
.sah-2.to [
MAX - FLOW - MIN - CUT THEOREM]
Dr
maximal Wet ones s - t - Thesesin even Nettwerk
(
D , u) (
use)
ist
glad
do mwuoku u -Lapenta
ele , s - t - Selah in D .
~ ⑤ ,
⇐
O\
I . ⑤sah-2.tt
: In e- new Nekwk(
D --NAI
, u)
uh u E IN
( gauntly
!) gin
esfue
Ile s,t
EV evenfluttehljeh
we time be S - t - This
f
C-INA
.[ Beau
a bide Seher :span ]
sah-2.ly [
Fuss - DEVON Positions -THEOREM
1st
f
E R!
ein s - t -Thess in(
D= C YAI , m)
, sogin
es in hengeP von s - t -
began
und emReye
I von ktiseu in
D
,
Son - e
w : Pu e → R
, o uh :
.
tact
:Fa =a¥uY!Q )
af Q
.
vallfl
= Iwfp )
PEP
. I Pu
et
sIAI
Bens :
tidy
. hesah-2.LI I
Sala oarMeyer
,gecidhk bogeudsjunkh
Valiant]
Sind D=
(
V, At onDigraph
wels , t E V und k EIN
,
so
giln
:Es
gin gear
damk
bogendsjmhh
s - t - Wege in D ,wenn es
far jedi Teenage
R
s A uhIR Kk
nodeven s - t -
Veg
in A - Rgin
.Being tiny
.Altman Forum linger
- de, Sakes 2.19Die maximal
tuned
cosbogen
- d'sjukka
s - t - Vegas istglial
drwin . males
Kardinal
. teh ew Bogeumege ,had dens Ent
funny kin
s - t -Wey
heh
- ex 's hut .Entered gin
esk bogadsjnahh
Fuge ok
esgin
- kBoga
,wed denn Eat
fumy kin
s - E -Weg
Wehr enslin