KO 3.1.17

(1)

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 ê- ^Q îst ^hleu _, ^dem fir âlle ÎEICM ⁾

and TEEGY ^ist ^Int ^line methane

they ⁱⁿ ^T ,

also

¥H=eEt×⇐t

⁼

^ltntl ^£ ^key

x= XCI )

(2)

.

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 ^"

(3)

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gain ^mn ^]× ^an ]×E ^KEXUY

mr ke _IC ^til ^und |kl=q( ^KY )

(4)

.

] ^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

.

Daun it

×*eRE ^mr

flti )

^-

flti

^. ^,

⁾ _, falls ^isk

¥

^. ⁼

{ _o

, fells ^isk

(5)

line Ophiuallosuy ^von

now { ( ^w ,x )

^:

xepcf ⁾ } ^,

wobi I. ={ ^e

^,

^,ez ^,

^. ^.

^,e ^is fr ^ielo ^, ^' ^,

^. ^.

^,n ^}

^.

KO 3.1.17

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 "

gain mn ]× an ]×E KEXUY

mr ke IC til und |kl=q( KY )

] v. ( k 'T× ) a- Y

÷

ICMI

⇒

] 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

,

KO ^3.1.17

Bem.4t= BH ⁾ ^ist ^die ^von drfr ^Blm ⁾

( ^Ap )

^× ⁽ ^ECM ⁾ ⁾ ⁼ ^rm ⁽ ^ECM ⁾ ⁾

^Ray ^von ^M

definwk ^Site ^von P±( ^N

Frjedes ^Metroid ^M _get

P±( ^M

^{ ^XEREC ^"

×(t ) ^a- rnct ⁾ team ₎ _,x ^> ⁰ }

^Si QERECM ^das _Polgedo _of ^In

P±C ¹⁴¹ ê- ^Q îst ^hleu _, ^dem fir âlle ÎEICM ⁾

and TEEGY ^ist ^Int ^line methane

they ⁱⁿ ^T ,

^ltntl ^£ ^key

gier ^Q ^a- ^to ,D* ^" ( ^da

xe=x(k})srm({e})e{ ^0,1 ^} )

gaenahljea ^Puuhh ⁱⁿ ^Q

find glum ^de charehkvishsda Vektnu

an mabhagjea ^Regen ⁱⁿ ^M

geuigt ^es ^, ^a aigk ^, ^des ^Q

en geuaelljes ^Blgbp ^ish ⁽ ^d. ^h

^cour ( ^QNZEC ^" ) ^oobr ^Equivalent ^den ^,

class Q ^uw

gauaahlg ^taken ^let )

des folgt ^as ^Kor

^4.19

; ^a-

D= Seen ( ^V

, A) Digraph ^md WERE

_Tnnhhon f

^2V→R ^ul

f ( ^x )

^w ⁽ ^Smk ⁾ )

Difede ^"

gain ^mn ^]× ^an ]×E ^KEXUY

mr ke _IC ^til ^und |kl=q( ^KY )

] ^v. ⁽ ^k ^'T× ) ^a- _Y

_ICMI

] ^I ⁺ |kY×|£

rmHnY/ rmcxuy ⁾

rnl ^× ⁾

⇒ rm( ^Xny ⁾ ⁺ _if ⁽ ^Xuy ⁾ term ⁽ ^X ⁾ ⁺ if ( ^Y ⁾ B-

^Metroid

^Polytope ^find Blgwatooide

^Seen f

^2E→R ⁽ ^E ^ended ⁾

^,

^, ^en ^} ^und ^we

^> ^we

^>

^-2 ^weu

fi ^k maximal ml we

> ⁰

×*eRE ^mr

⁾ _, falls ^isk

{ _o

, fells ^isk

line Ophiuallosuy ^von

now { ( ^w ,x )

xepcf ⁾ } ^,

wobi I. ={ ^e

^,ez ^,

^,e ^is fr ^ielo ^, ^' ^,

^,n ^}