s k 1 0 2 0 d 1 . . . s k 1 0 1 0 0 d 1 sk 1 0 2 0 d 1 . . . sk 1 0 1 0 0 d 1 s ur f a c e m o u n t s c h o t t k y r e c t i f i e r s C s i n g l e d i o d e s c h o t t k y - gl e i c hr i c h t e r f r d i e o b e r f l ? c h e n m o n t a g e C e i nz e l d i o d e v e rs i o n 2 0 0 9 - 0 7 - 0 3 d i m e n s i o n s - m a? e [ m m ] n o mi n al c u rre n t n e n n s t r o m 1 0 a r e p e t i t i v e p e ak re v e r s e v o l t ag e p e ri o d i s c h e s p i t z e n s p e rrs p a n n u n g 2 0 . . . 1 0 0 v p l as t i c c a s e k u n s t s t o f f g e h ? u s e t o - 2 5 2 a a d - p ak w e i g h t ap p ro x . g e w i c h t c a. 1 . 6 g p l as t i c mat e ri al h a s u l c l a s s i f i c at i o n 9 4 v - 0 g e h ? u s e mat e ri al u l 9 4 v - 0 k l as s i f i z i e rt s t a n d ard p ac k ag i n g t ap e d a n d re e l e d s t a n d ard l i e f e r f o rm g e g u rt e t a u f r o l l e m a x i m u m r a t i n g s a n d c h a r a c t e r i s t i c s g r e nz - u n d k e nn w e r t e t y p e t y p r e p e t i t i v e p e ak re v e r s e v o l t ag e p e ri o d i s c h e s p i t z e n s p e rrs p a n n u n g v rrm [ v ] s u r g e p e a k r e v e rs e v o l t ag e s t o ? s p i t z e n s p e rrs p an n u n g v rs m [ v ] f o rw ard v o l t ag e d u r c h l as s - s p a n n u n g v f [ v ] 1 ) i f = 5 a i f = 1 0 a s k 1 0 2 0 d 1 2 0 2 0 < 0 . 5 1 < 0 . 5 5 s k 1 0 3 0 d 1 3 0 3 0 < 0 . 5 1 < 0 . 5 5 s k 1 0 4 0 d 1 4 0 4 0 < 0 . 5 1 < 0 . 5 5 s k 1 0 4 5 d 1 4 5 4 5 < 0 . 5 1 < 0 . 5 5 s k 1 0 5 0 d 1 5 0 5 0 < 0 . 6 2 < 0 . 7 0 s k 1 0 6 0 d 1 6 0 6 0 < 0 . 6 2 < 0 . 7 0 s k 1 0 8 0 d 1 8 0 8 0 < 0 . 7 1 < 0 . 8 3 s k 1 0 1 0 0 d 1 1 0 0 1 0 0 < 0 . 7 1 < 0 . 8 3 m ax . a v e rag e f o rw ard re c t i f i e d c u rre n t , r - l o ad d a u e rg re n z s t r o m i n e i n w e g s c h al t u n g mi t r - l a s t t c = 1 0 0 c i f a v 1 0 a r e p e t i t i v e p e ak f o rw ard c u rre n t p e ri o d i s c h e r s p i t z e n s t ro m f > 1 5 h z i f rm 3 0 a 2 ) p e ak f o rw ard s u rg e c u r re n t 5 0 / 6 0 h z h al f s i n e - w a v e s t o ? s t r o m f r e i n e 5 0 / 6 0 hz s i n u s - ha l b w e l l e s k 1 0 2 0 . . . s k 1 0 6 0 d 1 t a = 2 5 c i f s m 1 3 5 / 1 5 0 a s k 1 0 8 0 . . . s k 1 0 1 0 0 d 1 t a = 2 5 c i f s m 1 1 5 / 1 2 5 a r at i n g f o r f u s i n g , t < 1 0 m s g re n z l as t i n t e g ral , t < 1 0 ms t a = 2 5 c i 2 t 8 0 a 2 s j u n c t i o n t e mp e rat u re C s p e rrs c h i c h t t e mp e rat u r s t o rag e t e mp e rat u re C l ag e r u n g s t e mp e rat u r t j t s - 5 0 . . . + 1 5 0 c - 5 0 . . . + 1 7 5 c 1 t j = 2 5 c 2 m ax . t e m p e r at u r e o f t h e c as e t c = 1 0 0 c C m ax . t e m p e r at u r d e s g e h ?u s e s t c = 1 0 0 c ? d i o t e c s e m i c o n d u c t o r ag h t t p : / / w w w . d i o t e c . c o m / 1 1 . 0 0 .5 2 . 3 2 4 3 1 t y p e t yp 5 .3 0 . 2 6 .6 0 . 2 2 . 7 7 . 0 0 . 2 1 6 . 0 0 . 2 1 3 2 /4 2 .3
s k 1 0 2 0 d 1 . . . s k 1 0 1 0 0 d 1 c h a r a c t e r i s t i c s k e n nw e r t e l e a k ag e c u rre n t s p e rr s t ro m s k 1 0 2 0 d 1 . . . s k 1 0 4 5 d 1 t j = 2 5 c t j = 1 0 0 c v r = v rrm i r < 3 0 0 a < 4 5 ma l e a k ag e c u rre n t s p e rr s t ro m s k 1 0 5 0 d 1 . . . s k 1 0 1 0 0 d 1 t j = 2 5 c t j = 1 0 0 c v r = v rrm i r < 2 0 0 a < 2 5 ma t h e rmal re s i s t an c e j u n c t i o n t o c a s e w ?rme w i d e rs t an d s p e rrs c h i c h t - g e h ? u s e r t h c < 2 . 5 k / w 2 h t t p : / / w w w . d i o t e c . c o m / ? d i o t e c s e m i c o n d u c t o r ag r a t e d f o r w a r d c u r r e n t vs . t e m p . o f t h e c a s e i n a b h . v . d . g e h ? u s e t e m p e r a t u r z u l . r i c h t s t r o m 1 2 0 1 0 0 8 0 6 0 4 0 2 0 0 i f a v [ % ] [ c ] t c 1 5 0 1 0 0 5 0 0 f o r w a r d c h a r a c t e r i s t i c s ( t y p i c a l v a l u e s ) d u r c h l a s s k e n n l i n i e n ( t y p i s c h e w e r t e ) s k 1 0 2 0 d 1 . . . s k 1 0 4 5 d 1 s k 1 0 5 0 d 1 , s k 1 0 6 0 d 1 s k 1 0 8 0 d 1 , s k 1 0 1 0 0 d 1 1 0 1 0 1 1 0 1 0 2 - 1 - 2 [ a ] i f 0 v f 0 . 4 0 . 6 [ v ] 1 . 0
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