module Satchmo.Binary.Op.Common
( iszero
, equals, lt, le, ge, eq, gt
, full_adder, half_adder
)
where
import Prelude hiding ( and, or, not, compare )
import qualified Satchmo.Code as C
import Satchmo.Boolean (MonadSAT, Boolean, Booleans, fun2, fun3, and, or, not, xor, assert, boolean)
import qualified Satchmo.Boolean as B
import Satchmo.Binary.Data (Number, make, bits)
import Satchmo.Counting
iszero :: (MonadSAT m) => Number -> m Boolean
iszero a = equals a $ make []
equals :: (MonadSAT m) => Number -> Number -> m Boolean
equals a b = do
equals' ( bits a ) ( bits b )
equals' :: (MonadSAT m) => Booleans -> Booleans -> m Boolean
equals' [] [] = B.constant True
equals' (x:xs) (y:ys) = do
z <- xor [x, y]
rest <- equals' xs ys
and [ not z, rest ]
equals' xs [] = and $ map not xs
equals' [] ys = and $ map not ys
le,lt,ge,gt,eq :: MonadSAT m => Number -> Number -> m Boolean
le x y = do (l,e) <- compare x y ; or [l,e]
lt x y = do (l,e) <- compare x y ; return l
ge x y = le y x
gt x y = lt y x
eq = equals
compare :: MonadSAT m => Number -> Number
-> m ( Boolean, Boolean )
compare a b = compare' ( bits a ) ( bits b )
compare' :: (MonadSAT m) => Booleans
-> Booleans
-> m ( Boolean, Boolean )
compare' [] [] = do
f <- B.constant False
t <- B.constant True
return ( f, t )
compare' (x:xs) (y:ys) = do
l <- and [ not x, y ]
e <- fmap not $ xor [ x, y ]
( ll, ee ) <- compare' xs ys
lee <- and [l,ee]
l' <- or [ ll, lee ]
e' <- and [ e, ee ]
return ( l', e' )
compare' xs [] = do
x <- or xs
never <- B.constant False
return ( never, not x )
compare' [] ys = do
y <- or ys
return ( y, not y )
full_adder :: (MonadSAT m)
=> Boolean -> Boolean -> Boolean
-> m ( Boolean, Boolean )
full_adder p1 p2 p3 = do
p4 <- boolean ; p5 <- boolean
assert [not p2,p4,p5]
assert [p2,not p4,not p5]
assert [not p1,not p3,p5]
assert [not p1,not p2,not p3,p4]
assert [not p1,not p2,p3,not p4]
assert [not p1,p2,p3,p4]
assert [p1,p3,not p5]
assert [p1,not p2,not p3,not p4]
assert [p1,p2,not p3,p4]
assert [p1,p2,p3,not p4]
return ( p4, p5 )
full_adder_plain a b c = do
let s x y z = sum $ map fromEnum [x,y,z]
r <- fun3 ( \ x y z -> odd $ s x y z ) a b c
d <- fun3 ( \ x y z -> 1 < s x y z ) a b c
return ( r, d )
half_adder :: (MonadSAT m)
=> Boolean -> Boolean
-> m ( Boolean, Boolean )
half_adder p1 p2 = do
p3 <- boolean ; p4 <- boolean
assert [not p2,p3,p4]
assert [p2,not p4]
assert [not p1,p3,p4]
assert [not p1,not p2,not p3]
assert [p1,not p4]
assert [p1,p2,not p3]
return ( p3, p4 )
half_adder_plain a b = do
let s x y = sum $ map fromEnum [x,y]
r <- fun2 ( \ x y -> odd $ s x y ) a b
d <- fun2 ( \ x y -> 1 < s x y ) a b
return ( r, d )