+ 2
Transkrypt
+ 2
C M S R P C T r ig g e r P r o g r e ss R e p o r t B a r i, H e ls in k i, L a p p e e n r a n ta , W a r s a w p r e s e n te d b y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S W e e k - M u o n T r ig g e r M e e tin g C e r n , M a r c h 1 6 , 2 0 0 4 C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S O u tlin e - U X C 5 5 R P C T r ig g e r - L in k B o x e s - U S C 5 5 R P C T r ig g e r - T r ig g e r R a c k s - g e n e r a l r e p o r ts C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S L in k S y s te m - D e te c to r E n d c a p R E 4 Y R E 3 E Y 4 - E R E 2 Y - -3 B a r r e l E R E 1 Y - -2 R E 5 E n d c a p + E R E 1 /1 - -1 R E 1 R E 2 R E 3 R E 4 R E 1 /1 Y B - Y -2 B Y - -1 B Y 0 - V M E C r a te s o n th e to w e r s , p a tc h p a n e ls o n th e b o tto m R P C c h a m b e r s c o n str u c te d fo r p h a se 1 o f C M S B Y 1 - B Y 2 - E Y 1 - R E 5 E Y 2 - E Y 3 - E 4 - o f th e to w e r s th is p a r ts w ill b e n o t b u ild in p h a s e 1 o f C M S C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S G e n e r a l la y o u t - r a c k s , c r a te s U X C 5 5 U S C 5 5 D e te c to r P e r ip h e r y (T o w e r s) D e te c to r d is ta n c e m a x 1 6 m F r o n t E n d L in k B o x e s B o a r d s (L B x s ) (F E B s ) d is ta n c e ~ 9 0 m o p tic a l 6 6 0 (* 7 5 6 ) R P C T r ig g e r R a c k s to G M T 2 x 4 m u o n s to D A Q e le c tr ic a l c a b le s ~ 1 0 k ( 1 1 ,5 ) o p tic a l 8 4 3 S lin k s H c a l H 0 (* ) - w ith R E 5 C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S G e n e r a l la y o u t - fu n c tio n s D e te c to r D e te c to r P e r ip h e r y C o u n tin g R o o m T r ig g e r C r a te (1 2 ) L in k B o x F E B L IN K F E C B O A R D (S la v e ) S P L IT T E R B O A R D T R IG G E R B O A R D R x L M U X F E B L IN K F E C B O A R D (M a ste r ) L M U X e le c tr ic a l T x R x C O N T R O L B O A R D C C U 1 3 6 b o x e s (2 6 0 C B s) o p tic a l F a n O u t T x 7 5 6 lin k s + 8 4 H O lin k s d a ta c o n tro l (D C S ) T T c R x D ia g n o s tic s C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 R x T x 6 0 P A C S O R T E R B a c k p la n e G B & S O R T E R R e a d o u t C o n c e n tr . P A C o p tic a l S o r te r C r a te (1 ) G B & S O R T E R B O A R D S O R T E R S O R T E R S O R T E R S O R T E R S O R T E R 2 S O R T E R 1 0 8 1 2 to G lo b a l M u o n T r ig g e r S O R T E R B O A R D (o n B a c k p la n e ) 1 4 4 lin k s /c r a te 1 7 3 2 /to ta l 1 S O R T E R S O R T E R S O R T E R 1 0 8 G O H lin k s D A T A C O N C E N T R A T O R C A R D E V E N T C O N C E N T e le c tr ic a l 3 to D A Q 3 S lin k s e le c tr ic a l I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C M u o n T r ig g e r - U X C 5 5 e le c tr o n ic s - in te g r a tio n is s u e s (c r a te s , c a b le s ) - e le c tr o n ic s s ta tu s C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S U X C 5 5 - L in k s I n v e n to r y lin k s R P C lin k s H O w ith o u t R E s e c to r to 5 5 6 7 8 4 5 ta l 6 0 w ith R E 5 s e c to r to ta l 6 3 7 5 6 L in k B o x R E 5 1 0 8 R E 5 1 2 4 * 5 8 8 9 8 0 2 1 6 1 2 6 8 4 1 1 2 4 2 4 8 1 2 7 2 1 2 7 2 1 2 L in k B o a r d M a s te r L in k B o a r d S la v e L in k B o a r d C o n tro l B o a rd L in k B o x R E 1 1 L in k B o a r d R E 1 1 M a s te r L in k B o a r d C o n tro l B o a rd V M E ~ C r a te s S p e c ia l C r a te s * R E 5 (R E 2 b is ) (4 5 d e g ) - 1 6 b o x e s - (n o t 3 0 d e g - 2 4 b o x e s ) C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S T r ig g e r C r a te s a n d fib e r s - B a r r e l W h e e ls 5 W h e e ls lik e th is o n e 5 fib e r s 5 fib e r s 5 fib e r s 5 fib e r s s in g le ( e .g . S 0 1 -G 5 1 0 m a v a ila 5 fib e r s fib e r s im p le x 5 0 /1 2 5 --L S F H 0 /C W J H 0 D 2 7 5 fib e r s b le a t C E R N ) B a r r e l W h e e l 5 fib e s in g le ( e .g . S 0 1 -G 5 1 0 m a v a ila r s fib e r s im p le x 5 0 /1 2 5 --L S F H 0 /C W J H 0 D 2 7 b le a t C E R N ) 5 fib e r s 5 fib e r s 5 fib e r s V M E C r a te s 5 fib e r s 5 fib e r s M u ltifib e r c a b le s P a tc h p a n e l( a d a p te r ) C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C T r ig g e r - T r ig g e r fib e r s - p r o p o s a l T r ig g e r m u ltifib e r c a b le s - 2 0 in c T r ig g e r s in g le f ib e r s - e .g . C E p a tc h p R P C lin k s B a r B a r E n d E n d E n d E n d E n d A ll r e l w r e l a c a p c a p c a p c a p c a p R P C h e ll w Y E Y E Y E R E a ll fib lu d R N a n e r s w ith e d ) p a tc o r a n g e e l - V M E L C c o n n h p a n e l c s im p le x , L in k b o T r ig g e r m u ltifib r e c a b le s c a b le s s p a r e fib e r s /c a b le e l h e 1 ( 2 ( 3 ( 1 /1 e ls -1 ) -2 ) -3 ) (-1 ) C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 4 5 4 2 2 2 4 6 2 8 4 8 to r s (s p a r e fib e se to b o tto m b a o m w h e e l (d is k (2 sp a r e s p e r b 2 r s lc o n y ) a lc o n y ) s in g le fib r e sp a r e s 6 0 2 0 2 e c lo fr x 3 0 0 7 2 8 4 3 6 3 6 4 5 6 7 5 6 8 4 0 8 8 4 4 4 8 8 8 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S L in k S y s te m - C o n tr o l P a th - I n te g r a tio n is s u e s (s a m p le ) C o n tr o l lin k s - B a r r e l C e n tr a l W h e e l r e d u n d a n t c h a in 1 2 C C U e le c tr ic a lly c o n n e c te d 1 W h e e l lik e th is B a r r e l W h e e l r e d u n d a n t c h a in 1 2 C C U e le c tr ic a lly c o n n e c te d V M E C r a te C o n tr o l b o a r d w ith C C U a n d D O H (+ 5 6 c m C o n tr o l b o a r d w ith C C U o n ly M U -sM U a d a p te r 8 r ib b o n c a b le fib e r ) M F S a d a p te r r ib b o n (1 2 fib e r s ) c a b le C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 M u ltir ib b o n fib e r c a b le M U fa n o u t 8 r ib b o n s (4 s p a r e s ) I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S L in k S y s te m T r a c k e r sy ste m - C o n tr o l P a th p a r ts r e q u ir e d R P C C o n tr o l sy ste m C C U D O H M U -sM U sM U F a n M F S a d a r ib b o n c a 9 6 fib e r c C C S (8 F a d a p o u t p te r s b le w a b le ( E C ) C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 c o n ta in s 2 4 r e d u n d a n t r in g s te r (1 2 c h a n n e l) 2 7 6 4 8 2 4 2 4 2 4 2 4 1 5 (4 c h a n n e l) ith M F S c o n n e c to r (~ 1 0 m ) 8 1 2 fib e r r ib b o n s ) 3 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S L in k C r a te s - B a r r e l W h e e ls V M E L in k C r a te s - 2 n e e d e d p e r R a c k , - 1 2 n e e d e d p e r w h e e l C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S L in k C r a te s - E n d c a p D is k R E 1 /2 R E 1 /3 C r a te s V M E L in k C r a te s - 3 n e e d e d p e r R a c k , - 1 2 n e e d e d p e r w h e e l C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 L m a x = 1 1 .5 m I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C T r ig g e r - U X C 5 5 e le c tr o n ic s (L in k s y s te m )s ta tu s P r o to ty p e r e a d y te s te d in 2 0 0 3 S y n c h te s t (G . W r o c h n a ta lk o n F r id a y p le n a r y s e s s io n ) P r e p r o d u c tio n v e r s io n u n d e r c o n s tr u c tio n (to b e r e a d y fo r sy n c h te sts 2 0 0 4 ) R E 1 1 S p e c ia l C r a te s " V M E lik e " C r a te s S e e E S R w e b p a g e h ttp : //h e p .f u w .e d u .p l/c m s /e s r / f o r e le c t r o n ic s d e s c r ip t io n C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S O n e L in k B o x c o n s tr u c tio n fo r a ll b a r r e l a n d e n d c a p s lo c a tio n s R E 5 - r e d u c e d n u m b e r o f b o x e s C B A R R E L E N D C A P s R B u p , d o w n - 1 0 b o x e s 5 * (1 M L B + 2 S L B )= > 1 5 L B + 2 C B R E 4 , R E 3 ( 6 0 d e g ) = ( R E 2 + R E 1 /2 ,R E 1 /3 ) ( 3 0 d e g ) - 4 8 b o x e s 4 * (M L B + 2 S L B ) + 2 * (M L B + S L B ) = > 1 6 L B + 2 C B S M 1 S 2 3 S 4 5 M S C S 6 7 8 9 M S S M S S M S C S 1 1 0 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 R B o th e r th a n u p , d o w n - 5 0 b o x e s 3 * (M L B + 2 S L B ) + 2 * (M L B + S L B ) = > 1 3 L B + 2 C B C 1 S 2 M 3 S 4 S 5 M 6 S 7 C 8 9 M S S M S S M 1 0 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 M S 2 S 3 4 M 5 S S M 6 7 C 8 9 M S S M S S M S 1 0 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 R E 5 (R E 2 b is ) (4 5 d e g ) - 1 6 b o x e s !!! 3 * (M L B + 2 S L B ) + 3 * (M L B + S L B ) = > 1 5 L B + 2 C B C 1 S 2 3 M S 4 S 5 M 6 S 7 M 8 S 9 C M S M S S M S 1 0 1 1 1 2 1 3 1 4 1 5 1 6 1 7 1 8 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S L in k B o x e s " V M E lik e " - p r e p r o d u c tio n v e r s io n (1 ) F r o n tp la n e C o n tr o l B o a r d C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 B a c k p la n e L in k B o a r d I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S L in k B o x e s " V M E lik e " - p r e p r o d u c tio n v e r s io n (2 ) F r o n tp la n e C o n tr o l B o a r d L in k B o a r d B a c k p la n e W C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 ill b e s e n t to p r o d u c tio n n e x t w e e k I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C M u o n T r ig g e r - U S C 5 5 e le c tr o n ic s - in te - e le c - S p - T r - S o - D C - C C g r a tio n is s tr o n ic s s ta litte r B o a r ig g e r b o a r r te r B o a r d C B o a r d s S B o a r d s C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 u e s ( tu s d s (S d s (T s (S B (E c a (T r a r a c k s, c r a te s) P B ) B ) ) l) c k e r ) I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S U S C 5 5 - R P C T r ig g e r r a c k s (e x tr a c te d fr o m R a c k W iz z a r d ) P A C T T r ig g e r R a c k (4 ) S 1 D S 1 D S 1 D S 1 D C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 0 3 0 4 , 0 6 , 0 7 P A C T S o r te r , R e a d o u t R a c k (1 ) S 1 D 0 5 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S U S C 5 5 - T r ig g e r C r a te s - S p litte r B o a r d s I n v e n to r y R P C (a ll) H O T o ta l Q u a d S p litte r 1 9 2 2 4 2 1 6 D u a l S p litte r 4 2 0 6 0 4 8 0 S p litte r s B o a r d (S P B ) - 4 q u a d + 8 d u a l s p litte r s 6 0 S P B s n e e d e d in to ta l (5 S P B s p e r R P C T r ig g e r C r a te ) C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S S p litte r - L a p p e e n r a n ta M H M H O P T re c e iv e r M A X 3 2 6 9 H F D 3 1 8 0 -1 0 2 a x o n a x o n im lim ittin g a m e y w e ll o p tic a l r im la s e r d riv e r e y w e ll V C S E L p lifie e c e iv M A X la s e r 1 :5 d iff c lk d riv e r M C 1 0 0 E P 1 4 r M A X 3 2 6 9 e r H F D 3 1 8 0 -1 0 2 3 9 9 6 H F E 4 1 9 0 -5 4 1 O P O P T P T T t r t a r t a r n a n s n sm sm m i t i t t i e t t e r t e r r O O P T t r M a M n A s A m X X i 3 t 3t 9 e 9 9 r 9 6 6 M A X M H H 3 FA 9 F T 9X T X 6 3 X X 9 X 9 X 6 X X X H F HE 4 F 1 T 9 X 0 X- 5 X 4 1 X G e n e r ic Q u a d S p litte r d e s ig n B E R te s ts h a v e b e e n c o m p le te d fo r th e 1 s t p r o to ty p e to ta l s e v e r a l w e e k s o f te s tin g tim e -> 0 e r r o r s te m p e r a tu r e r a n g e 0 -4 0 d e g r e e s M a tti I s k a n iu s fe c it C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S S p litte r - L a p p e e n r a n ta fib e r s o u t 4 x s p litte r 2 x s p litte r 4 x s p litte r 2 x s p litte r 4 x s p litte r 2 x s p litte r 4 x s p litte r 2 x s p litte r 2 x s p litte r 2 x s p litte r 2 x s p litte r 2 x s p litte r V M E P O W E R fib e r s in 9 U x 4 0 0 m m V M E fo r m fa c to r s p litte r h a s b e e n d e s ig n e d in c lu d in g 4 x 4 x s p litte r a n d 8 x 2 x s p litte r M a tti I s k a n iu s fe c it C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S S p litte r - L a p p e e r a n ta n e x t p h a s e is to o r d e r th e c ir c th e p r o to ty p e s fo r th e 9 U V M p r o to ty p e s w ill b e m a c h in e a s lin e to te s t m a n u fa c tu r in g a fte r th e V M E p r o to ty p e s a r e is r e a d y fo r v o lu m e p r o d u c tio u it b o a r d a n d a s s e m b le E s p litte r s e m b le d in p r o d u c tio n n te s te d th e s p litte r 4 q u a d s p litte r s w ill b e d e liv e r e d fo r J u n e S y n c h te s ts C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S U S C 5 5 - (T C , S C ) C r a te s, (T B , S B ) B o a r d s In v e n to r y T r ig T r ig T C D a t S o r S o r S C g e r g e r b a c k a C o te r B te r C b a c k T o ta l B o a rd (T B ) 1 0 8 C ra te (T C ) 1 2 p la n e (T C b ) 1 2 n c e n tr a to r C a r d (D C C E c a l) 3 o a rd (S B ) 2 ra te (S C ) 1 p la n e (S C b ) 1 C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S U S C 5 5 - L in k s I n v e n to r y a ll 4 x 2 x 2 x * 1 x T r ig g e r B o a r d s: L in k In p u ts 1 7 2 4 1 8 2 3 2 2 5 E n E n E n E n E n E n E n E n E n 1 1 1 1 1 1 3 1 4 2 4 1 3 2 2 1 2 1 r 1 8 3 4 E n 1 2 B n 2 b s B n B n B n E n B n B n E n B n t a b c d E n E n E n E n E n E n 4 3 4 2 3 3 3 2 2 2 2 3 H n 1 H n 1 + E n E n E n E n E n E n E n T o w e r s 5 1 5 1 3 2 4 1 4 2 3 1 1 1 c d a b + + + + s + E n E n E n E n E n E n 5 3 5 2 3 2 3 3 4 2 4 3 2 a 2 b 1 b 1 3 2 d 2 e 2 3 2 c H n 3 H n 3 + E n 5 3 B n 2 c + + + + + E n 1 1 r+ T B n 4 B n 2 b + E n 1 2 + T B n 3 -1 6 :-1 3 -1 2 :-9 B n B n E n B n B n B n 2 e 2 d 1 3 1 b 2 b 2 a T B n -8 :-5 + + 1 8 1 4 1 6 1 6 B n 1 a B n 1 b a ll B n 0 b B p 0 b B n B n B n B n B n 2 d 2 e 1 d 1 e 1 c H n H n H n H n 2 B n B n B n B n B n 1 c 1 e 1 d 2 e 2 d B n B p B n B p 1 8 4 4 B p 1 a B p 1 b 0 e 1 d 1 d 0 e B m 0 c 1 H m H m + 1 + 2 + + B m 0 c + + + B p B n B p B n + + + 0 e 1 d 1 d 0 e 1 8 1 4 2 + + + B p B p B p B p B p 2 d 2 e 1 d 1 e 1 c H p H p H p H p 2 B p B p B p B p B p 1 c 1 e 1 d 2 e 2 d B p B p B p E p B p B p E p B p 1 1 + 2 + + + + + + + 2 B n 1 b + B n 1 a + T B n 1 B p 0 b + B n 0 b + T B 0 -4 :-2 -1 :1 B p 1 b + B p 1 a + T B p 1 2 :4 2 5 E p 1 2 B p 2 b H p 3 H p 3 + H p 1 H p 1 + E p E p E p E p E p E p E p E p E p E p E p E p + + 1 7 2 a 2 b 1 b 1 3 2 d 2 e 2 3 2 c E p 5 3 B p 2 c + + 1 8 2 3 B p B p E p B p B p B p 2 e 2 d 1 3 1 b 2 b 2 a T B p 5 :8 + + + 4 E p E p E p E p E p E p E p E p E p 4 3 4 2 3 3 3 2 2 2 2 3 5 3 5 2 3 2 3 3 4 2 4 3 + + + + + + + 2 1 5 8 1 6 3 6 4 1 4 7 0 E p E p E p E p E p E p E p 1 1 1 1 1 1 3 1 4 2 4 1 3 2 2 1 2 1 a ll/c r a te 6 4 7 2 8 1 4 1 5 8 to ta l 1 9 2 4 3 2 4 8 1 6 8 r s S p 1 4 5 t a b c d 5 1 c d 5 1 a b 3 2 4 1 4 2 3 1 1 1 s + B p 2 b + E p 1 2 + T B p 3 E p 1 1 r+ T B p 4 9 :1 2 1 3 :1 6 litte r s /C r a te 6 4 x 2 x to ta l 0 6 S p litte r s H O /c r a te 2 5 7 S p 1 9 4 8 6 7 2 o n ly /to ta l 2 4 6 0 8 4 litte r s to ta l 4 x 0 2 x 2 b a rre l e n d c a p s H O R E 5 L in k s to ta l 3 0 0 3 6 0 8 4 9 6 8 4 0 S e e W W W 1 9 4 8 1 6 8 4 L in k s to ta l 2 4 x 0 2 x 8 1 x 0 S p litte r s /c r a te 1 6 4 x 4 0 2 x D A lin k s /c 7 8 4 Q L in k s to ta l ra te c ra te # 0 1 2 0 D A Q L in k s /T B lin k s /c r a te T B # 7 0 9 8 fo r d e ta ils : h t t p : //p c c m s 9 .ig f .f u w .e d u .p l/u s e r s /t b /C M S /D r a w in g s /K u d la /b a c k p la n e 1 5 c .x ls C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C M u o n T r ig g e r D a ta b a s e - " c la s s ic a l" a s p e c t: - U X C 5 5 - lin k b o x e s , lin k b o a r d s , c a b le s - U S C 5 5 - t r ig g e r c r a t e s , t r ig g e r b o a r d s , s p lit t e r s , f ib e r s , ... - " n o n c la s s ic a l" a s p e c t: - U S C 5 5 - P A C d e fin itio n s , P A C d a ta c o n fig u r a tio n s (V H D L c o d e s ) h t t p : //p c c m s 9 .ig f .f u w .e d u .p l/lin k s /in d e x .j s p A lm o s t a ll g e n e r a te d fr o m C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 s im u la tio n d a ta I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C M u o n T r ig g e r D a ta b a s e (s a m p le s 1 ) T B lin k in p u ts (T B 0 , s e c to r 1 1 ) S p litte r lis t (s e c to r 0 a n d 1 ) F ib e r n a m e T B n a m e S p 2 S p 4 C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C M u o n T r ig g e r D a ta b a s e (s a m p le s 2 ) P A C in p u t c o n fig u r a tio n v h d l o n e lo g ic a l p la n e d e f P A C lo g ic a l p la n e s (H O in c lu d e d ) C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 L in k in p u t -- S a t M a r 1 3 1 7 :1 8 :2 5 2 -- F ile g e n e r a te d b y C M lib r a r y ie e e ; p a c k a g e L o g P la n e _ c o n n - - ... c o n s ta n t L o g P la n e C o n n -- L o g S e c to r L o g P la n -- | T o w e r | L in k -- | | | | | | -- | | | | | | -- d a ta fo r fir s t lo g P la n e ,( 1 1 , - 1 5 , 1 , 2 , 0 , ,( 1 1 , - 1 5 , 1 , 5 , 0 , ,( 1 1 , - 1 5 , 1 , 1 , 0 , ,( 1 1 , - 1 5 , 1 , 4 , 0 , ,( 1 1 , - 1 5 , 1 , 3 , 0 , -- a ll to g e th e r b its to b e ,( 1 1 , - 1 5 , 1 , 2 , 0 , ,( 1 1 , - 1 5 , 1 , 5 , 0 , ,( 1 1 , - 1 5 , 1 , 1 , 0 , ,( 1 1 , - 1 5 , 1 , 4 , 0 , ,( 1 1 , - 1 5 , 1 , 3 , 0 , - - ... ); e n d ; 0 0 4 S R P C M u o n T r ig g e r - S e a r c h E n g in e is :T L o g P e L in k | L o g P | L in k | | 0 , 3 2 , 6 4 , 9 6 , 1 2 8 , O R e d 0 , 3 2 , 6 4 , 9 6 , 1 2 8 , la C la S 3 2 , 3 2 , 3 2 , 3 2 , 3 2 , w it 6 4 , 6 4 , 6 4 , 6 4 , 6 4 , n e T h a n n e L tr ip a b n e e f sC le := ( l L in k L e ftS tr ip tS tr ip o u n t 3 2 ) 3 2 ) 3 2 ) 3 2 ) 3 2 ) h p r iv io u s d a ta 3 2 ) 3 2 ) 3 2 ) 3 2 ) 3 2 ) I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C M u o n T r ig g e r D a ta b a s e (s a m p le s 3 ) P A C p a tte r n v h d l p a tte r n d e f a lg o r ith m ty p e - - ... c o n s ta n t P A C P a ttT a b le :T P A C -r e f lA lB lC -- to w e r = 0 -- a lg o r ith ty p e -g r o u p in d e x (r e fe r e n c e d iv -q u a lity g r o u p in d e x ( T ,0 ,0 ,( S ,2 1 ,2 1 ) ,( S ,1 3 ,1 3 ) ,( S , 0 ,( T ,0 ,0 ,( S ,1 9 ,1 9 ) ,( S ,1 1 ,1 1 ) ,( S , 0 ,( T ,0 ,0 ,( S ,2 2 ,2 2 ) ,( S ,1 4 ,1 4 ) ,( S , 1 ,( T ,0 ,0 ,( S ,2 0 ,2 0 ) ,( S ,1 2 ,1 2 ) ,( S , 1 - - ... ,( T ,0 ,1 ,( Q , 1 , 1 ) ,( Q , 2 , 2 ) ,( Q , 0 , ,( T ,0 ,1 ,( Q ,1 0 ,1 0 ) ,( Q , 5 , 5 ) ,( Q , 1 ,( T ,0 ,1 ,( Q , 2 , 2 ) ,( Q , 3 , 3 ) ,( Q , 1 , C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 m u o n s ig n & c o d e P a ttT a b le := ( lD lE d ir c o d e is io n ) , 0 , 0 , 1 , 1 ) ,( ) ,( ) ,( ) ,( S , S , S , S , 6 , 6 , 7 , 7 , 6 ) 6 ) 7 ) 7 ) ,( ,( ,( ,( S , S , S , S , 5 , 7 , 6 , 8 , 5 ) 7 ) 6 ) 8 ) ,( ,( ,( ,( S , S , S , S , 8 , 8 , 9 , 9 , 8 ) 8 ) 9 ) 9 ) , 0 , 1 , 0 , 1 ,3 ,3 ,3 ,3 1 ) 1 ) 1 ) 1 ) ----3 2 1 0 0 ) ,( D , 5 , 5 ) ,( S ,9 9 ,9 9 ) ,( S ,9 9 ,9 9 ) , 1 , 5 ) - - 2 0 6 1 , 1 ) ,( D , 4 , 4 ) ,( S ,9 9 ,9 9 ) ,( S ,9 9 ,9 9 ) , 0 , 5 ) - - 2 0 6 2 1 ) ,( D , 7 , 7 ) ,( S ,9 9 ,9 9 ) ,( S ,9 9 ,9 9 ) , 1 , 5 ) - - 2 0 6 3 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S T r ig g e r C r a t e - in r a c k s S 1 D 0 3 ,4 ,6 ,7 - F r o n t s id e M G O H S P B S P B S P B S P B S P B S P B V T B T B T B T B T B T B T B T B T B E fib e r o u tp u t d u a l H o n e y w e ll L C o p to c o n n e c to r C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 sp a r e S P B I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S T r ig g e r B o a r d 1 ,7 c m 4 0 ,0 c m P A C S e c to r P r o c e sso r S y n c h P A C S e c to r P r o c e sso r 3 6 ,0 c m P A C S e c to r P r o c e sso r V M E C o n tr o l (J ta g , II) X tr a x (o p tio n a l) V M E E th e r n e t G B , S o r te r P A C S e c to r P r o c e sso r D A Q T lk 2 5 0 1 C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 c o n c e n tr a to r G O H I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S T r ig g e r B o a r d O p to R e c S y n c h r o P A C m e z z a n in e 1 P A C m e z z a n in e 3 P A C m e z z a n in e 4 T lk 2 5 0 1 D A Q T r a n sm O p tic a (b u t B T B P C (h o p e J u n e is s io n l r e c e iv E R te s B u n d e fu lly r e te sts) stu d y d o n e e r w o r k in g ts n e e d e d ) r d e s ig n a d y fo r C o m m e r c ia l O p to r e c e iv e r C u sto m m a d e O p to r e c e iv e r in H o n e y w e ll h o u s in g m e z z a n in e L V D S b u ffe r C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S S o r te r (R e a d o u t, C o n tr o l) C r a te - in r a c k S 1 D 0 5 M D D D C C C V E C C S B C S B F S B C C S C C S C C S d a ta c o n n e c to r s fr o m T r ig g e r C r a te s T T C C o n n e c to r N G K r ib b o n c o n n e c to r fr o m T C 's E c a l B a r i, W a r sa w T r a c k e r N G K r ib b o n c o n n e c to r fr o m D C S r e d u n d a n t c h a in C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S S o r te r b o a r d s str u c tu r e - B a r i F in a l S o r te r H a lf d e te c to r S o r te r 2 H a lf d e te c to r S o r te r 1 E n d c a p s O u tp u ts B a rre l O u tp u ts T T C R x o p tic a l In p u t G iu s e p p e d e R o b e r tis fe c it C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S S o r te r m a in b o a r d s tr u c tu r e - B a r i L V D S R e c iv e r V M E In te r fa c e A M P S C S I-3 S ta c k e d c o n n e c to r P C B O A R D V M E J T A G S o rte r F P G A E th e rn e t c o n n e c to r C u s to m B a c k p la n e T T C rx B a c k -b o a rd c o n n e c to r C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 P o w e r s u p p ly r e g u la to r s G iu s e p p e d e R o b e r tis fe c it I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S S o r te r b a c k b o a r d str u c tu r e - B a r i L V D S R e c iv e r A M P S C S I-3 S ta c k e d c o n n e c to r M a in b o a r d c o n n e c to r G iu s e p p e d e R o b e r tis fe c it C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S F in a l S o r te r b o a r d s tr u c tu r e - B a r i A M P S C S I-3 S ta c k e d c o n n e c to r P C B O A R D V M E J T A G F in a l S o rte r F P G A T T C o p tic a l in p u t C u s to m B a c k p la n e T T C rx & fa n o u t P o w e r s u p p ly r e g u la to r s G iu s e p p e d e R o b e r tis fe c it C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S O n ly tw o ty p e s o f b ig s o r te r F P G A s - B a r i F in a l S o rte r F P G A In p u t s y n c h r o n iz e r B 2 In p u t s y n c h r o n iz e r 8 0 M H z = > 4 0 M H z E 2 4 m u o n s B a rre l L U T 4 + 4 m u o n s B a rre l S o rte r E n d c a p s S o rte r B a r r e l F ilte r E n d c a p s F ilt e r F in a l G h o s tb u s te r 8 in p u ts A d a p tiv e d e la y 4 m u o n s E n d c a p s S o rte r E 1 6 *4 m u o n s E n d c a p s A d a p tiv e d e la y 4 m u o n s I1 8 *4 m u o n s 4 m u o n s B a rre l L U T S o rte r F P G A B a rre l S o rte r 4 + 4 m u o n s B a rre l A d a p tiv e d e la y B 1 4 m u o n s 4 m u o n s I8 G iu s e p p e d e R o b e r tis fe c it C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S S o r te r C r a te d e s ig n s ta tu s -B a r i M a n y V H (s im u la te - J ta g c o - In te r n a - D ia g n o - g e n e r ic - g h o st b - fin a l g h D L c o d e s d , se v e r a l n tr o lle r , l in te r fa c e s tic s so r te r u s tin g c o d o s t b u s tin r e a d y o r a d v a n c e d te s te d o n d iffe r e n t p r o to ty p e s ): (II), e s o n T B a n d T B b a c k p la n e g c o d e o n S o r te r B o a r d B a r i p r o je c t a d v a n c e d - W a r s a w d ia g n o s tic s s h o u ld b e m e r g e d in - b o a r d d e s ig n s ta r ts s o o n C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S T T C p a r ts 1 . 2 . 3 . 4 . 5 . 6 . 1 tr ig g e r p a r titio n -> 1 T T C c i n e e d e d T T C o c -> 2 6 n e e d e d (s e e b e lo w ) 2 6 lo n g s in g le m o d e c a b le s fr o m U S C 5 5 to U X C 5 5 s in g le m o d e p a tc h c o r d s fr o m T T C o c to L b o x e s -> 2 6 0 (1 0 m ) T T C o p to r e c e iv e r s -> 2 6 0 T T C r x - b o u g h t a lr e a d y (2 4 0 0 p c s ) T T C o c c a lc u la tio n B a B a E n E n E n E n E n E n T o # o c C B / s i d e # C B / w h e e l / d i s k T T C o c 1 6 / s i d Te T C o c 1 6 / w h e e l / d i s # k l b o x / s i d e # l b o x / w h e e l / d i s k r r e l w h e ll 1 2 2 4 1 2 6 1 2 r r e l a ll w h e e ls 1 2 0 1 0 6 0 d c a p Y E 1 2 0 4 0 + 6 * 2 4 1 0 2 0 d c a p R E 1 1 1 o n Y E 1 1 6 d c a p Y E 2 0 0 0 d c a p Y E 3 6 1 2 1 2 3 6 d c a p Y E 4 6 1 2 1 2 3 6 d c a p a ll 1 4 0 ** 1 6 6 4 ta l 2 6 0 2 6 1 2 4 * fro m R E 1 1 1 2 1 3 6 * * w ith R E 1 1 C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S L a te n c y (to b e r e v is e d in s o r te r p a r t) U X C T O F U S C S y n c h r o L m u x C a b le D ia g n o s tic s F ib e r O p to R e c A sy n c h r o n o u s S p litte r S y n c h r o n o u s L B T B 0 1 0 2 0 P A C L d e m u x (B u ffe r ) D ia g n o s tic s L d e m u x (B u ffe r ) S y n c h r o G B P h i D ia g n o s tic s S o r te r 3 0 G B E ta S o r te r G B E ta D ia g n o s tic s S o r te r D ia g n o s tic s 4 0 S o r te r S o r te r D ia g n o s tic s S y n c h r o n o u s T B 4 0 L m u x T C b a c k p la n e F ib e r O p to R e c S p litte r 7 0 6 0 5 0 S y n c h r o C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 L d e m u x P A C S B G B P h i G B E ta S y n c h r o 8 0 S o r te r L V D S C a b le D ia g n o s tic s F P G A I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C T r ig g e r - U S C 5 5 e le c tr o n ic s s ta tu s T B , R D , L B p r o to ty p e s d o n e , u se d fo r V C o n tr o l (In te r n a l In te r fa c e II) F P G A R e c e iv e r B o a r d in d e b u g g in g (o p to c ir c u M a n y V H D L c o d e s r e a d y , s im u la te d (S o P A C V H D L c o d e d e v e lo p e m e n t a d v a n c e I n te r fa c e s e s ta b lis h e d S p litte r q u a d s p litte r te s te d S p litte r V M E b o a r d u n d e r c o n s tr u c tio n T B p r e p r o d u c tio n u n d e r c o n s tr u c tio n H D L c o d e s te sts (J ta g , S o r te r , it, fin a l S y n c h r o F P G A te s ts ) r te r , G h o st b u ste r ) d A im - to b e r e a d y fo r J u n e 2 0 0 4 s y n c h te s ts w ith S p litte r a n d T r ig g e r a n d D C C B o a r d s S e e E S R w e b p a g e h ttp : //h e p .f u w .e d u .p l/c m s /e s r / f o r e le c t r o n ic s d e s c r ip t io n C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity C M S R P C T r ig g e r M ile s to n e s ite m R P C R P C R P C R P C R P C R P C R P C R P C R P C R P C R P C R P C R P C L in k B T r ig g e S o r te r R /O B T r ig g e L in k B T r ig g e S p litte S y ste m T r ig g e R /O B T r ig g e S o r te r m ile s to n e d o a r d r B d B d d r C r a te o a r d r B d r B d r B d r C r a te B d C M S W e e k - M u o n T r ig g e r M e e tin g - M a r c h 1 6 , 2 0 0 4 P r o d u P P P d D e s ig n P P P d P r o to P r o d u P r o d u P r o d u S y ste m P r o d u P r o d u P r o d u P r o d u c tio o n e d o o n e d o n c tio c tio c tio te c e d c e d c e d c e d d a te n sta r t n e e n d n s n s st ( & & & & S e p -0 3 D e c -0 3 A u g -0 3 D e c -0 4 F e b -0 3 o n e M a r -0 4 ta r t J u n -0 4 ta r t O c t-0 4 2 c r a te s) M a r -0 5 te ste d D e c -0 5 te ste d D e c -0 5 te ste d D e c -0 5 te ste d D e c -0 5 c o m m e n t d e la y d e la y d e la y in c lu d e la y d e la y d e la y e d e d e d d e e d e d e d A p r -0 4 A p r -0 4 J u l-0 4 d o n T B A p r -0 4 N o v -0 4 S e p -0 4 in c lu d e d o n T B I g n a c y M a c ie k K u d la , W a r s a w U n iv e r s ity