SIFAT-SIFAT SEMIRING DAN KONSTRUKSINYA

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Sukarno Setiawan
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1 Jr E Me S Vo No SIFAT-SIFAT SEMIRING DAN KONSTRUKSINYA A Rhw Uver Pere Tgg Dr U (Up) Jog Kope Pope Dr U Reoo Peerog Jog J 648 rhw@gco ABSTRAK Serg ef eg hp oog eg oper er (peh per) D wh oper peh erg erp oo of wh oper per erp egrp er ery f rf per erhp peh (rf r ) Seper rr rg erg g e eerp rr f-f erp yg ep e; peg o; ver; eee e hooorfe Serg p or r h gg erg eg oper per-opoe rf Sey erg yg g r r Booe hgg eg r eh r erp erg e of eg e epy peg o P g hr g hw hp poo p ee erg poo eg oper p poo K Kc: erg h gg erg rf r Booe erg poo erg PENDAHULUAN D ry h pe eh f-f erg ory Dr erg yg eh ef g h eerp rr f-f yg erp eper rr rg yg ep: e peg o ver eee e hooorfe Serg p or r h gg erg eg oper per-opoe rf Serg yg g r r Booe hgg eg r eh r erp erg e of eg e epy peg o P g hr g hw hp poo p ee erg poo eg oper p poo K Teor Def : Hp hgg (fe e) erp hp oog epy ggo eg g pof D hp hgg (fe e) erp hp hgg Def : M C D h hp oog M h hp (proc e) r C e D yg o eg C D h hp yg e e pg err ( c ) c C D ecr e eg: C D ( c ) : c C D} Koep r h hp p per ey hgg r hp eg cr yg r H hp-hp C C C o eg C C C y pg err r pe ecr for eg er: C C C ( c c c ) : c C ep eg } Def 3: M f : C D ; fg r hp C e hp D 65

2 A Rhw Sf-Sf Serg Kory f - (ef) hy ep eee ere C pe (yg) e eee ere ere f p (ref) hy ep eee D erp pe (yg) eee C 3 f erorepoe - (ef) hy f - p Def 4: Hp oog H eg oper er e egrp eeh: () H H () ( ) c ( c) c G Segrp H eg oper o eg ( H ) Def 5: Segrp ( H ) yg eeh f e H e e H e oo e erp eee e J opery erf of e oo of Def 6: Seh re R r hp C e hp D h hp oog r C D Def 7: R e re r pr p hp oog P eeh o-o wh : J c P : R (f refef) J R R (f er) 3 J R Rc Rc (f rf) By re p hp err pr (poe) o eg H err ( ) R ( ) R eh ec eg eh er eg ( P ) ( P ) e hp err pr (poe) Def 8: Hp err h hp yg er re r pr Def 9: M C hp err eg re D hp r C K eee erer r D D x ep x D Def : M C hp err eg re D hp r C K eee erec r D D x ep x D Def : D hp r C er eh eee c C ee ehgg x c ep x D c e r D J hp e D epy eee erec eee ere e erec (pre) r D o eg p ( D ) er hw p( D ) erp eee r D J p( D ) D erp eee erer r D Def : D hp r C er wh eh eee c C ee ehgg c x ep x D c e wh r D J hp r e wh D epy eee erer eee ere e wh erer (f) r D o eg f ( D ) er hw f( D ) erp eee r D J f( D ) D erp eee erec r D 66

3 A Rhw Sf-Sf Serg Kory Def 3: Hp err pr ( P ) e hp err o r P Def 4: M ( P ) hp err x P M x o eg ege wh r x y y P y x} x o eg ege x y y P x y} Tgg x ef eg y p ege wh x ; eg gg eee x h y p r erpg yg erhr x Def 5: Poe ( L ) e hp err p ( x f ( x ep x y L p ( x ry h p x y} f ( x h f x y} ep x y L A 6: Sep hp err o h hp err P hp err ( L ) pery-pery er eve e x y L x y p ( x y c f ( x x Def 7: L r ( L ) h hp oog L eg oper er (gg) (r) yg eeh yr-yr eg er e x y z L er: L x y y x x y y x L x x ( y z) ( x z ( y z) ( x z L 3 x ( x x x ( x x L4 x x x x x x Teore 8: M ( L ) hp err J x y f( x x y p( x ( L ) h r Teore 9: M ( L ) r Def x y x y x ( x y y ) M ( L ) hp err Def : L e r re r o p L ( L ) hp err P r L er ep L py Def : M L M Pee f : L M e hooorfe r x y f ( f ( e x y L Def : M L M Pee f : L M e oorfe r : f hooorfe r f ref f ef Def 3: L L rf e x y z L er x ( y z) ( x ( x z) x ( y z) ( x ( x z) Def 4: L L eg eee erec eee erer e eropee ep x L pg e eee y ee ehgg x y x y y e opee x 67

4 A Rhw Sf-Sf Serg Kory A 5: J L rf ep x L epy pg y opee yg o eg x ' Def 6: Ar Booe h err eg eee erer eee erec yg erf rf eropee Peh Def 3: Hp oog S eg oper er + (peh per) e erg eeh eerp o er: ( S ) erp oo of ( S ) erp egrp 3 Oper per rf erhp oper peh y: ( ) c ( c) ( c) ( c) ( ) ( c) c S Serg S eg oper per + oper e g eg ( S ) Def 3: Serg ( S ) erp erg of egrp ( S ) h egrp of J egrp ( S ) of ( S ) e erg o of Def 33: Der erg ( S ) J egrp ( S ) erp oo erg ( S ) erp erg eg eee e Def 34: M ( S ) h erg J N ee hgg ry ( ey ) S eg hw erg ( S ) errer P S errer r S J yg e erg ( S ) errer o r S Def 35: M S S erg Serg S S = ( ) S; S} erp h gg S S eg oper per-opoe De g S S S S ( 3 3 )/ S ; 3 } g erp erg eg oper yg erp eg S S Def 36: M ( S ) erg P P S P e erg r S P wh oper yg eg oper S ee erg Def 37: M S erg I I S I e e (r) S : I erp erg I( I) ; e I S Def 38: M ( S ) erg I I S I e S I erp e e r S Def 39: M ( S ) h erg x S } e peg o S y S y x y Def 3: M ( S ) erg o of eg eee e I x S epy eee e (r) y S x y I ( y x I) Def 3 : M ( S ) h erg x S e epoe x x x x 68

5 A Rhw Sf-Sf Serg Kory Def 3: M S ' S erg Pee ' : S S e hooorfe erg ( ) ( ) ( ) ( ) ( ) ( ) e S Def 33: M ( S ) erg S e erg e (rc) eg Def 34: M ( S ) erg eg e I x S vere epy ver y S x y y x I Teore 35 : M ( L ) rf eg eee erec ( L ) h erg B: Deh : ( L ) h rf A ( L ) erp erg ( L ) erp oo of Dr ef e hw L erp wh oper () Oper () of L Oper () of L v erp eee e L wh oper () Dr () - (v) ( L ) erp of oo ( L ) erp egrp Dr ef e hw L erp wh oper ( ) Oper ( ) of L Dr () () ( L ) erp egrp 3 ( L ) erp rf (eh) Berr ()-(3) ( L ) erp erg A 36: H gg r - rf eg eee erec o h erg B: Berr Def 3 h gg erg h erg Kre rf eg eee erec o h erg (Teore 35) h gg - rf h erg A 37: Se r h erg B: Dr pee eey ep r rf Berr Teore 35 e r erp erg A 38: Sep r Booe erp erg B: Kre ep r Booe rf err Teore 35 ep r Booe erp erg Teore 39: Serg yg erp rf errer o B: A eee L yg erf N Def 3: M L eg eee o L e o e L A 3: M B r Booe hgg A hp e o B M B oorf eg P (A) hp A Deg ( B ) ( P( A) ) B: Kre B r Booe hgg gg ep o r Booe Berr o eee erwh Dp hw ep eee o B erp gg o-o 69

6 A Rhw Sf-Sf Serg Kory why Deg x B x x B / x & h o} Kre B hp hgg gg hp hgg e M y B x o} D M z x y' Jeh hw y x e y erp gg eee-eee x A z M gg z ergrgy Tep wh z pg e eee yg ggy Deg o z Kre z py: y z y z y ( x y' ) y x ( y y') x Kre y J ey y o x o- o ere x y g y ( ) ( ) ( ) ( ) J y Tep err hw o ere r ep o Se Kre x z z x p eyp hw h h o r o I or ehgg z Kre z x x x ( y y') ( x ( x y') ( x x y J x y Kre x y y x x y Def fg f : B P (A) eg f ( ) : B o} e B M v B v J o v e v I err f ( ) f ( v) J f h fg yg hooorfe r A erg v B eg f ( ) f ( v) M f ( ) A ) f ( v) A v} Berr h eey v e e-y erp gg oo f ( ) f ( v) J f ef 3 A erg X P(A) Tep x X A hw f ( X Jeh X f ( e ep X o ph x Sey erg o wh x A X M X x x x } X M x x x Kre x epy re = x x x x ) ( 3 ( x ) ( x) ( x3) ( x ) J ; or e o B J ep o wh x p eee X ; err f ( X Kre X f ( f ( X p eyp f ( X J f ref Dr () (3) f oorfe r 7

7 A Rhw Sf-Sf Serg Kory J er hw B oorf eg P (A) y ( B ) ( P( A) ) Teore 3: Ar Booe hgg eg B h gg eh hgg r Booe hgg erp erg e of eg e epy peg o B: Teh hw ep r Booe h erg U e g per eore cp ee eof y eee e er peg o A erg B eg Kre ep eee o r Booe erp gg o-o why re eg Je r ef oper p B hw oper of erp eee e wh oper Kre B B e pg e o Ph Deg ergrgy o-o h yg erp peg o B H gg eh hgg erg erp erg Teh ep r Booe erp erg err h gg eh hgg r Booe g erp erg U e g e r eore cp eey eof y eee e er peg o A erg x x x x } B B B y y y y } B B B eg x y Dr e - pe ep: x y x y x y Kre r Booe erp erg e x y x y x y ehgg x } y } Je r ef oper p B hw oper of 3 } erp eee e wh oper B B e pg e o x y x x } B B B y y } B B B Jeh x y ep x y x y } } Def 33: M ( S ) erg of eg eee e x o M ere S x e o x x eg g o egf eg oefeoefe S D poo p( x x q ( x x S x p( ; ep K eef p c ( c c c x eg ; ep D eef p( x x eg Teore 34: Hp poo ep S x eg oper er + (peh per) ee erg poo of 7

8 A Rhw Sf-Sf Serg Kory Serg poo x S eg oper per + oper e g ( S [ ) B: Jeh r ef oper peh per yg e S x erp wh e oper ( S x ) erp oo of A erg p( r( S[ eg p ( x x q ( x x r ( x ) c c x c x K epy [ p( ] r( [( ) ( ) x ( ) x ] r( eg ( ) [( ) c) ( ) c ) x ( ) c ) x ] eg ( ) Kre oper peh of S J oper peh S x of Ph S[ M O( x x x ( ) ( ) x ( ) x x x p( ep p( S x Dr () ( ) epy erp oo of S x erp egrp S x A erg p( r( S[ eg p ( x x q ( x x r c c x c x ( M x x eg [ p( ] r( ( ( c c x x x c x ) ) ( p( [( ( c)) ( ( c )) x ( p( [ r( ] J oper peh x S of A erg p( S[ eg p x x ( q x x p( ( [( ) ( ) x ( [( ) ( c ) x ( ; ( ) p( ) x ] c ) x ] ( e c )) e x x ] e x ) ( eg e c w Kre w w ehgg e w eg ; w w err c w w w w c 7

9 A Rhw Sf-Sf Serg Kory w c w w p( [ r( ] Deg eer hw ep r yg erp r yg p oper per of J oper per of S x A erg p( S[ eg q p ( x x ( x x ( p( eg x x p( J oper per S x of Dr - epy S x erp egrp of 3 A erg p( r( S[ eg [ p x x ( q x x ( r c c x c x ( ( p( ) ( p( r( ) + c ( )] c ( p( [ r( ] c ( p( r( ) ( r( ) + c c [( p( ( ] r( Oper per rf erhp oper peh S x Dr () ( 3) eyp S erp erg of x Teore 35: J S erg e p peg o e p erg poo S x DAFTAR RUJUKAN J Dw 3 Topoog Sry: UNESA Uvery Pre Ky W B Vh Srche Serg Sefe Sevecor Spce Jor Aerc Reerch Pre hp://wwwgpe/~r che/vh-boo3pf Kr Shr Srr Ar Uh Jr Me: UNESA Sry L Rof Pz Ger Appe Ar Ager Seco Eo Sprger Verg: Ber hp://wwwoogoogeco/oo? = M Mche 7 Orer Lce Depre of Mhec: McG Uvery hp://wwwhcgc//math3 87/3873Spf M 7 Booe Ager Propoo Logc Depre of Mhec: McG Uvery hp://wwwhcgc//math3 87/3874Spf Soego A Shr Sr 993 Mer Poo Srr Ar: Mo - Jr: Peer Uver Ter 73

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