type ReducerState = State ReducerRecord
-data ReducerZeroRecord = ReducerZ { i0 :: ArrayIndex
- , inp :: CircState
- , pipe ::
- ,
- }
-
-- ===========================================================
-- = Discrimintor: Hands out new discriminator to the system =
-- ===========================================================
+{-# ANN discriminator (InitState 'initDiscrState) #-}
discriminator :: DiscrState -> (DataInt, ArrayIndex) -> (DiscrState, (DataInt, Discr), Bool)
discriminator (State (DiscrR {..})) (data_in, index) = ( State ( DiscrR { prev_index = index
, cur_discr = cur_discr'
-- ======================================================
-- = Input Buffer: Buffers incomming inputs when needed =
-- ======================================================
+{-# ANN circBuffer (InitState 'initCircState) #-}
circBuffer :: CircState ->
((DataInt, Discr), Shift) ->
(CircState, Cell, Cell)
, out1, out2
)
where
- n = fromIntegerT (undefined :: AdderDepth)
+ (n :: RangedWord AdderDepth) = fromInteger (fromIntegerT (undefined :: AdderDepth))
(rdptr',count') | shift == 0 = (rdptr , count + 1)
| shift == 1 = if rdptr == 0 then (n , count ) else
(rdptr - 1, count )
-- ============================================
-- = Simulated pipelined floating point adder =
-- ============================================
+{-# ANN fpAdder (InitState 'initPipeState) #-}
fpAdder :: FpAdderState -> (Cell, Cell) -> (FpAdderState, Cell)
fpAdder (State pipe) (arg1, arg2) = (State pipe', pipe_out)
where
-- ===================================================
-- = Optimized Partial Result Buffer, uses BlockRAMs =
--- ===================================================
+-- ===================================================
+{-# ANN resBuffO (InitState 'initResultState) #-}
resBuffO :: OutputStateO -> ( Cell, Cell, ArrayIndex, (Discr, Bool)) -> (OutputStateO, Cell, OutputSignal)
resBuffO (State (OutpO {..})) (pipe_out, new_cell, index, (discrN, new_discr)) = ( State ( OutpO { valid_mem = valid_mem'
, mem1 = mem1'
let input = siminput
let istate = initstate
let output = run reducer istate input
- mapM_ (\x -> putStr $ ("(" P.++ (show x) P.++ ")\n")) output
+ mapM_ (\x -> putStr $ ((show x) P.++ "\n")) output
return ()
runReducer = ( reduceroutput
(P.take n (randindex 7 0))
main = runReducerIO
+initDiscrState :: DiscrRecord
+initDiscrState = DiscrR { prev_index = (255 :: ArrayIndex)
+ , cur_discr = (127 :: SizedWord DiscrSize)
+ }
+
+initCircState :: CircRecord
+initCircState = Circ { mem = copy (0::DataInt,0::Discr)
+ , rdptr = (14 :: RangedWord AdderDepth)
+ , wrptr = (14 :: RangedWord AdderDepth)
+ , count = (0 :: RangedWord (AdderDepth :+: D1))
+ }
+
+initPipeState :: Vector AdderDepth Cell
+initPipeState = copy notValid
+
+initResultState :: RAM DiscrRange CellType
+initResultState = copy NotValid
+
initstate :: ReducerState
-initstate = State ( Reducer { discrState = State ( DiscrR { prev_index = (255 :: ArrayIndex)
- , cur_discr = (127 :: SizedWord DiscrSize)
- })
- , inputState = State ( Circ { mem = copy (0::DataInt,0::Discr)
- , rdptr = (14 :: RangedWord AdderDepth)
- , wrptr = (14 :: RangedWord AdderDepth)
- , count = (0 :: RangedWord (AdderDepth :+: D1))
- })
- , pipeState = State ( copy notValid )
- -- , resultState = State ( Outp { res_mem = copy notValid
- -- , lut = State (copy (0::ArrayIndex))
- -- })
- , resultState = State ( OutpO { valid_mem = copy NotValid
- , mem1 = State (copy (0::DataInt))
- , mem2 = State (copy (0::DataInt))
- , lutm = State (copy (0::ArrayIndex))
- })
+initstate = State ( Reducer { discrState = State initDiscrState
+ , inputState = State initCircState
+ , pipeState = State initPipeState
+ , resultState = State OutpO { valid_mem = initResultState
+ , mem1 = State (copy (0::DataInt))
+ , mem2 = State (copy (0::DataInt))
+ , lutm = State (copy (0::ArrayIndex))
+ }
})
{-# ANN siminput TestInput #-}
siminput :: [(DataInt, ArrayIndex)]
siminput = [(1,0),(5,1),(12,1),(4,2),(9,2),(2,2),(13,2),(2,2),(6,2),(1,2),(12,2),(13,3),(6,3),(11,3),(2,3),(11,3),(5,4),(11,4),(1,4),(7,4),(3,4),(4,4),(5,5),(8,5),(8,5),(13,5),(10,5),(7,5),(9,6),(9,6),(3,6),(11,6),(14,6),(13,6),(10,6),(4,7),(15,7),(13,7),(10,7),(10,7),(6,7),(15,7),(9,7),(1,7),(7,7),(15,7),(3,7),(13,7),(7,8),(3,9),(13,9),(2,10),(9,11),(10,11),(9,11),(2,11),(14,12),(14,12),(12,13),(7,13),(9,13),(7,14),(14,15),(5,16),(6,16),(14,16),(11,16),(5,16),(5,16),(7,17),(1,17),(13,17),(10,18),(15,18),(12,18),(14,19),(13,19),(2,19),(3,19),(14,19),(9,19),(11,19),(2,19),(2,20),(3,20),(13,20),(3,20),(1,20),(9,20),(10,20),(4,20),(8,21),(4,21),(8,21),(4,21),(13,21),(3,21),(7,21),(12,21),(7,21),(13,21),(3,21),(1,22),(13,23),(9,24),(14,24),(4,24),(13,25),(6,26),(12,26),(4,26),(15,26),(3,27),(6,27),(5,27),(6,27),(12,28),(2,28),(8,28),(5,29),(4,29),(1,29),(2,29),(9,29),(10,29),(4,30),(6,30),(14,30),(11,30),(15,31),(15,31),(2,31),(14,31),(9,32),(3,32),(4,32),(6,33),(15,33),(1,33),(15,33),(4,33),(3,33),(8,34),(12,34),(14,34),(15,34),(4,35),(4,35),(12,35),(14,35),(3,36),(14,37),(3,37),(1,38),(15,39),(13,39),(13,39),(1,39),(5,40),(10,40),(14,40),(1,41),(6,42),(8,42),(11,42),(11,43),(2,43),(11,43),(8,43),(12,43),(15,44),(14,44),(6,44),(8,44),(9,45),(5,45),(12,46),(6,46),(5,46),(4,46),(2,46),(9,47),(7,48),(1,48),(3,48),(10,48),(1,48),(6,48),(6,48),(11,48),(11,48),(8,48),(14,48),(5,48),(11,49),(1,49),(3,49),(11,49),(8,49),(3,50),(8,51),(9,52),(7,52),(7,53),(8,53),(10,53),(11,53),(14,54),(11,54),(4,54),(6,55),(11,55),(5,56),(7,56),(6,56),(2,56),(4,56),(12,56),(4,57),(12,57),(2,57),(14,57),(9,57),(12,57),(5,57),(11,57),(7,58),(14,58),(2,58),(10,58),(2,58),(14,58),(7,58),(12,58),(1,58),(11,59),(8,59),(2,59),(14,59),(6,59),(6,59),(6,59),(14,59),(4,59),(1,59),(4,60),(14,60),(6,60),(4,60),(8,60),(12,60),(1,60),(8,60),(8,60),(13,60),(10,61),(11,61),(6,61),(14,61),(10,61),(3,62),(10,62),(7,62),(14,62),(10,62),(4,62),(6,62),(1,62),(3,63),(3,63),(1,63),(1,63),(15,63),(7,64),(1,65),(4,65),(11,66),(3,66),(13,66),(2,67),(2,67),(5,68),(15,68),(11,68),(8,68),(4,69),(11,69),(12,69),(8,69),(7,70),(9,70),(6,70),(9,70),(11,70),(14,70),(5,71),(7,71),(11,72),(5,72),(3,72),(2,72),(1,73),(13,73),(9,73),(14,73),(5,73),(6,73),(14,73),(13,73),(3,74),(13,74),(3,75),(14,75),(10,75),(5,75),(3,75),(8,75),(9,76),(7,76),(10,76),(10,76),(8,77),(10,77),(11,77),(8,77),(2,77),(9,77),(9,77),(12,77),(4,77),(14,77),(10,77),(7,77),(3,77),(10,78),(8,79),(14,79),(11,80),(15,81),(6,81),(4,82),(6,82),(1,82),(12,83),(6,83),(11,83),(12,83),(15,83),(13,83),(1,84),(2,84),(11,84),(5,84),(2,84),(2,84),(3,84),(4,85),(6,86),(5,86),(15,86),(8,86),(9,86),(9,87),(9,87),(12,87),(4,87),(13,88),(14,88),(10,88),(11,88),(7,88),(4,88),(9,88),(1,88),(4,88),(4,88),(12,88),(8,89),(3,89),(10,89),(10,89),(5,89),(14,89),(11,89),(10,89),(5,90),(6,90),(10,90),(9,90),(8,90),(10,90),(5,90),(11,90),(6,90),(10,90),(7,90),(3,91),(7,91),(5,91),(15,91),(4,91),(6,91),(8,91),(1,91),(8,91),(12,92),(8,93),(9,93),(12,94),(8,94),(5,94),(11,95),(13,95),(5,96),(12,96),(8,96),(4,96),(7,97),(6,97),(4,97),(1,98),(5,98),(12,98),(13,99),(7,100),(12,100),(4,100),(10,100),(2,101),(3,101),(14,101),(12,101),(5,101),(2,101),(14,101),(15,101),(7,102),(13,102),(5,102),(7,102),(4,102),(8,102),(12,103),(15,103),(2,103),(2,103),(6,103),(6,103),(1,104),(14,104),(15,105),(3,105),(13,105),(1,105),(8,105),(8,105),(15,105),(13,105),(13,105),(6,105),(9,105),(6,106),(14,107),(12,107),(7,108),(7,108),(6,109),(11,109),(14,110),(8,111),(5,111),(15,111),(14,111),(3,111),(13,112),(12,112),(5,112),(10,112),(7,112),(5,113),(3,113),(2,113),(1,113),(15,113),(8,113),(10,113),(3,114),(6,114),(15,114),(4,115),(8,115),(1,115),(12,115),(5,115),(6,116),(2,116),(13,116),(12,116),(6,116),(10,117),(8,117),(14,118),(10,118),(3,118),(15,119),(6,119),(6,120),(5,121),(8,121),(4,122),(1,122),(9,123),(12,123),(6,124),(10,124),(2,124),(11,124),(9,125),(8,126),(10,126),(11,126),(14,126),(2,126),(5,126),(7,126),(3,127),(12,127),(15,128),(4,128),(1,129),(14,129),(8,129),(9,129),(6,129),(1,130),(11,130),(2,130),(13,130),(14,131),(2,131),(15,131),(4,131),(15,131),(8,131),(3,131),(8,132),(1,132),(13,132),(8,132),(5,132),(11,132),(14,132),(14,132),(4,132),(14,132),(5,132),(11,133),(1,133),(15,133),(8,133),(12,133),(8,134),(14,135),(11,136),(9,137),(3,137),(15,138),(1,138),(1,139),(4,139),(3,140),(10,140),(8,141),(12,141),(4,141),(12,141),(13,141),(10,141),(4,142),(6,142),(15,142),(4,142),(2,143),(14,143),(5,143),(10,143),(8,143),(9,143),(3,143),(11,143),(6,144),(3,145),(9,145),(10,145),(6,145),(11,145),(4,145),(13,145),(5,145),(4,145),(1,145),(3,145),(15,145),(14,146),(11,146),(9,146),(9,146),(10,146),(9,146),(3,146),(2,146),(10,146),(6,146),(7,146),(3,147),(4,147),(15,147),(11,147),(15,147),(1,147),(15,147),(14,147),(15,147),(5,147),(15,147),(4,147),(2,148),(12,149),(12,150),(10,150),(1,150),(7,151),(4,151),(14,151),(15,151),(5,152),(11,153),(3,153),(1,153),(1,153),(12,153),(1,154),(1,155),(11,155),(8,155),(3,155),(8,155),(8,155),(2,155),(9,156),(6,156),(12,156),(1,156),(3,156),(8,156),(5,157),(9,157),(12,157),(6,157),(8,158),(15,159),(2,159),(10,160),(10,160),(2,160),(6,160),(10,160),(8,160),(13,160),(12,161),(15,161),(14,161),(10,161),(13,161),(14,161),(3,161),(2,161),(1,161),(11,161),(7,161),(8,161),(4,162),(9,163),(3,164),(5,164),(9,164),(9,165),(7,165),(1,165),(6,166),(14,166),(3,166),(14,166),(4,166),(14,167),(5,167),(13,167),(12,167),(13,168),(9,168)]
-