{-# LANGUAGE BangPatterns, FlexibleContexts #-}
module Phonetic.Languages.Simplified.DataG where
import qualified Data.Foldable as F
import Data.Monoid
import Data.SubG
import Data.MinMax.Preconditions
data Result t a b c = R {Result t a b c -> t a
line :: !(t a), Result t a b c -> b
propertiesF :: !b, Result t a b c -> c
transPropertiesF :: !c} deriving Result t a b c -> Result t a b c -> Bool
(Result t a b c -> Result t a b c -> Bool)
-> (Result t a b c -> Result t a b c -> Bool)
-> Eq (Result t a b c)
forall a. (a -> a -> Bool) -> (a -> a -> Bool) -> Eq a
forall (t :: * -> *) a b c.
(Eq b, Eq c, Eq (t a)) =>
Result t a b c -> Result t a b c -> Bool
/= :: Result t a b c -> Result t a b c -> Bool
$c/= :: forall (t :: * -> *) a b c.
(Eq b, Eq c, Eq (t a)) =>
Result t a b c -> Result t a b c -> Bool
== :: Result t a b c -> Result t a b c -> Bool
$c== :: forall (t :: * -> *) a b c.
(Eq b, Eq c, Eq (t a)) =>
Result t a b c -> Result t a b c -> Bool
Eq
instance (Ord (t a), Ord b, Ord c) => Ord (Result t a b c) where
compare :: Result t a b c -> Result t a b c -> Ordering
compare Result t a b c
x Result t a b c
y
= case c -> c -> Ordering
forall a. Ord a => a -> a -> Ordering
compare (Result t a b c -> c
forall (t :: * -> *) a b c. Result t a b c -> c
transPropertiesF Result t a b c
x) (Result t a b c -> c
forall (t :: * -> *) a b c. Result t a b c -> c
transPropertiesF Result t a b c
y) of
!Ordering
EQ -> case b -> b -> Ordering
forall a. Ord a => a -> a -> Ordering
compare (Result t a b c -> b
forall (t :: * -> *) a b c. Result t a b c -> b
propertiesF Result t a b c
x) (Result t a b c -> b
forall (t :: * -> *) a b c. Result t a b c -> b
propertiesF Result t a b c
y) of
!Ordering
EQ -> t a -> t a -> Ordering
forall a. Ord a => a -> a -> Ordering
compare (Result t a b c -> t a
forall (t :: * -> *) a b c. Result t a b c -> t a
line Result t a b c
x) (Result t a b c -> t a
forall (t :: * -> *) a b c. Result t a b c -> t a
line Result t a b c
y)
!Ordering
z -> Ordering
z
!Ordering
z0 -> Ordering
z0
data FuncRep2 a b c = D (a -> b) (b -> c)
getAC :: FuncRep2 a b c -> (a -> c)
getAC :: FuncRep2 a b c -> a -> c
getAC (D a -> b
f b -> c
g) = b -> c
g (b -> c) -> (a -> b) -> a -> c
forall b c a. (b -> c) -> (a -> b) -> a -> c
. a -> b
f
getAB :: FuncRep2 a b c -> (a -> b)
getAB :: FuncRep2 a b c -> a -> b
getAB (D a -> b
f b -> c
_) = a -> b
f
getBC :: FuncRep2 a b c -> (b -> c)
getBC :: FuncRep2 a b c -> b -> c
getBC (D a -> b
_ b -> c
g) = b -> c
g
maximumEl
:: (Foldable t2, Ord c) => FuncRep2 (t a) b c
-> t2 (t a)
-> Result t a b c
maximumEl :: FuncRep2 (t a) b c -> t2 (t a) -> Result t a b c
maximumEl !FuncRep2 (t a) b c
frep2 t2 (t a)
data0 =
let !l :: t a
l = (t a -> t a -> Ordering) -> t2 (t a) -> t a
forall (t :: * -> *) a.
Foldable t =>
(a -> a -> Ordering) -> t a -> a
F.maximumBy (\t a
x t a
y -> c -> c -> Ordering
forall a. Ord a => a -> a -> Ordering
compare (FuncRep2 (t a) b c -> t a -> c
forall a b c. FuncRep2 a b c -> a -> c
getAC FuncRep2 (t a) b c
frep2 t a
x) (FuncRep2 (t a) b c -> t a -> c
forall a b c. FuncRep2 a b c -> a -> c
getAC FuncRep2 (t a) b c
frep2 t a
y)) t2 (t a)
data0
!m :: b
m = FuncRep2 (t a) b c -> t a -> b
forall a b c. FuncRep2 a b c -> a -> b
getAB FuncRep2 (t a) b c
frep2 t a
l
!tm :: c
tm = FuncRep2 (t a) b c -> b -> c
forall a b c. FuncRep2 a b c -> b -> c
getBC FuncRep2 (t a) b c
frep2 b
m in R :: forall (t :: * -> *) a b c. t a -> b -> c -> Result t a b c
R {line :: t a
line = t a
l, propertiesF :: b
propertiesF = b
m, transPropertiesF :: c
transPropertiesF = c
tm}
minMaximumEls
:: (InsertLeft t2 (t a), Monoid (t2 (t a)), Ord (t a), Ord c) => FuncRep2 (t a) b c
-> t2 (t a)
-> (Result t a b c,Result t a b c)
minMaximumEls :: FuncRep2 (t a) b c -> t2 (t a) -> (Result t a b c, Result t a b c)
minMaximumEls !FuncRep2 (t a) b c
frep2 t2 (t a)
data0 =
let (!t a
ln,!t a
lx) = (t a -> t a -> Ordering) -> t2 (t a) -> (t a, t a)
forall a (t :: * -> *).
(Ord a, InsertLeft t a, Monoid (t a)) =>
(a -> a -> Ordering) -> t a -> (a, a)
minMax11ByC (\t a
x t a
y -> c -> c -> Ordering
forall a. Ord a => a -> a -> Ordering
compare (FuncRep2 (t a) b c -> t a -> c
forall a b c. FuncRep2 a b c -> a -> c
getAC FuncRep2 (t a) b c
frep2 t a
x) (FuncRep2 (t a) b c -> t a -> c
forall a b c. FuncRep2 a b c -> a -> c
getAC FuncRep2 (t a) b c
frep2 t a
y)) t2 (t a)
data0
!mn :: b
mn = FuncRep2 (t a) b c -> t a -> b
forall a b c. FuncRep2 a b c -> a -> b
getAB FuncRep2 (t a) b c
frep2 t a
ln
!mx :: b
mx = FuncRep2 (t a) b c -> t a -> b
forall a b c. FuncRep2 a b c -> a -> b
getAB FuncRep2 (t a) b c
frep2 t a
lx
!tmn :: c
tmn = FuncRep2 (t a) b c -> b -> c
forall a b c. FuncRep2 a b c -> b -> c
getBC FuncRep2 (t a) b c
frep2 b
mn
!tmx :: c
tmx = FuncRep2 (t a) b c -> b -> c
forall a b c. FuncRep2 a b c -> b -> c
getBC FuncRep2 (t a) b c
frep2 b
mx in (R :: forall (t :: * -> *) a b c. t a -> b -> c -> Result t a b c
R {line :: t a
line = t a
ln, propertiesF :: b
propertiesF = b
mn, transPropertiesF :: c
transPropertiesF = c
tmn}, R :: forall (t :: * -> *) a b c. t a -> b -> c -> Result t a b c
R {line :: t a
line = t a
lx, propertiesF :: b
propertiesF = b
mx, transPropertiesF :: c
transPropertiesF = c
tmx})
maximumElR
:: (Foldable t2, Ord c) => t2 (Result t a b c)
-> Result t a b c
maximumElR :: t2 (Result t a b c) -> Result t a b c
maximumElR = (Result t a b c -> Result t a b c -> Ordering)
-> t2 (Result t a b c) -> Result t a b c
forall (t :: * -> *) a.
Foldable t =>
(a -> a -> Ordering) -> t a -> a
F.maximumBy (\Result t a b c
x Result t a b c
y -> c -> c -> Ordering
forall a. Ord a => a -> a -> Ordering
compare (Result t a b c -> c
forall (t :: * -> *) a b c. Result t a b c -> c
transPropertiesF Result t a b c
x) (Result t a b c -> c
forall (t :: * -> *) a b c. Result t a b c -> c
transPropertiesF Result t a b c
y))
minMaximumElRs
:: (InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)), Ord (t a), Ord b, Ord c) => t2 (Result t a b c)
-> (Result t a b c,Result t a b c)
minMaximumElRs :: t2 (Result t a b c) -> (Result t a b c, Result t a b c)
minMaximumElRs = (Result t a b c -> Result t a b c -> Ordering)
-> t2 (Result t a b c) -> (Result t a b c, Result t a b c)
forall a (t :: * -> *).
(Ord a, InsertLeft t a, Monoid (t a)) =>
(a -> a -> Ordering) -> t a -> (a, a)
minMax11ByC (\Result t a b c
x Result t a b c
y -> c -> c -> Ordering
forall a. Ord a => a -> a -> Ordering
compare (Result t a b c -> c
forall (t :: * -> *) a b c. Result t a b c -> c
transPropertiesF Result t a b c
x) (Result t a b c -> c
forall (t :: * -> *) a b c. Result t a b c -> c
transPropertiesF Result t a b c
y))
innerPartitioning
:: (InsertLeft t2 (t a), Monoid (t2 (t a)), InsertLeft t2 c, Monoid (t2 c), Ord c) => FuncRep2 (t a) b c
-> t2 (t a)
-> (t2 (t a), t2 (t a))
innerPartitioning :: FuncRep2 (t a) b c -> t2 (t a) -> (t2 (t a), t2 (t a))
innerPartitioning !FuncRep2 (t a) b c
frep2 t2 (t a)
data0 =
let !l :: c
l = t2 c -> c
forall (t :: * -> *) a. (Foldable t, Ord a) => t a -> a
F.maximum (t2 c -> c) -> (t2 (t a) -> t2 c) -> t2 (t a) -> c
forall b c a. (b -> c) -> (a -> b) -> a -> c
. (t a -> c) -> t2 (t a) -> t2 c
forall (t :: * -> *) b a.
(InsertLeft t b, Monoid (t b)) =>
(a -> b) -> t a -> t b
mapG (FuncRep2 (t a) b c -> t a -> c
forall (t :: * -> *) a b c. FuncRep2 (t a) b c -> t a -> c
toTransPropertiesF' FuncRep2 (t a) b c
frep2) (t2 (t a) -> c) -> t2 (t a) -> c
forall a b. (a -> b) -> a -> b
$ t2 (t a)
data0 in (t a -> Bool) -> t2 (t a) -> (t2 (t a), t2 (t a))
forall (t :: * -> *) a.
(InsertLeft t a, Monoid (t a)) =>
(a -> Bool) -> t a -> (t a, t a)
partitionG ((c -> c -> Bool
forall a. Eq a => a -> a -> Bool
== c
l) (c -> Bool) -> (t a -> c) -> t a -> Bool
forall b c a. (b -> c) -> (a -> b) -> a -> c
. FuncRep2 (t a) b c -> t a -> c
forall a b c. FuncRep2 a b c -> a -> c
getAC FuncRep2 (t a) b c
frep2) t2 (t a)
data0
innerPartitioningR
:: (InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)), InsertLeft t2 c, Monoid (t2 c), Ord c) => t2 (Result t a b c)
-> (t2 (Result t a b c), t2 (Result t a b c))
innerPartitioningR :: t2 (Result t a b c) -> (t2 (Result t a b c), t2 (Result t a b c))
innerPartitioningR t2 (Result t a b c)
dataR =
let !l :: c
l = t2 c -> c
forall (t :: * -> *) a. (Foldable t, Ord a) => t a -> a
F.maximum (t2 c -> c)
-> (t2 (Result t a b c) -> t2 c) -> t2 (Result t a b c) -> c
forall b c a. (b -> c) -> (a -> b) -> a -> c
. (Result t a b c -> c) -> t2 (Result t a b c) -> t2 c
forall (t :: * -> *) b a.
(InsertLeft t b, Monoid (t b)) =>
(a -> b) -> t a -> t b
mapG Result t a b c -> c
forall (t :: * -> *) a b c. Result t a b c -> c
transPropertiesF (t2 (Result t a b c) -> c) -> t2 (Result t a b c) -> c
forall a b. (a -> b) -> a -> b
$ t2 (Result t a b c)
dataR in (Result t a b c -> Bool)
-> t2 (Result t a b c)
-> (t2 (Result t a b c), t2 (Result t a b c))
forall (t :: * -> *) a.
(InsertLeft t a, Monoid (t a)) =>
(a -> Bool) -> t a -> (t a, t a)
partitionG ((c -> c -> Bool
forall a. Eq a => a -> a -> Bool
== c
l) (c -> Bool) -> (Result t a b c -> c) -> Result t a b c -> Bool
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Result t a b c -> c
forall (t :: * -> *) a b c. Result t a b c -> c
transPropertiesF) t2 (Result t a b c)
dataR
maximumGroupsClassification
:: (InsertLeft t2 (t a), Monoid (t2 (t a)), Ord c, InsertLeft t2 c, Monoid (t2 c), Integral d) => d
-> FuncRep2 (t a) b c
-> (t2 (t a), t2 (t a))
-> (t2 (t a), t2 (t a))
maximumGroupsClassification :: d
-> FuncRep2 (t a) b c
-> (t2 (t a), t2 (t a))
-> (t2 (t a), t2 (t a))
maximumGroupsClassification !d
nGroups !FuncRep2 (t a) b c
frep2 (t2 (t a)
dataT,t2 (t a)
dataF)
| t2 (t a) -> Bool
forall (t :: * -> *) a. Foldable t => t a -> Bool
F.null t2 (t a)
dataF = (t2 (t a)
dataT,t2 (t a)
forall a. Monoid a => a
mempty)
| d
nGroups d -> d -> Bool
forall a. Ord a => a -> a -> Bool
<= d
0 = (t2 (t a)
dataT,t2 (t a)
dataF)
| Bool
otherwise = d
-> FuncRep2 (t a) b c
-> (t2 (t a), t2 (t a))
-> (t2 (t a), t2 (t a))
forall (t2 :: * -> *) (t :: * -> *) a c d b.
(InsertLeft t2 (t a), Monoid (t2 (t a)), Ord c, InsertLeft t2 c,
Monoid (t2 c), Integral d) =>
d
-> FuncRep2 (t a) b c
-> (t2 (t a), t2 (t a))
-> (t2 (t a), t2 (t a))
maximumGroupsClassification (d
nGroups d -> d -> d
forall a. Num a => a -> a -> a
- d
1) FuncRep2 (t a) b c
frep2 (t2 (t a)
dataT t2 (t a) -> t2 (t a) -> t2 (t a)
forall a. Monoid a => a -> a -> a
`mappend` t2 (t a)
partT,t2 (t a)
partF)
where (!t2 (t a)
partT,!t2 (t a)
partF) = FuncRep2 (t a) b c -> t2 (t a) -> (t2 (t a), t2 (t a))
forall (t2 :: * -> *) (t :: * -> *) a c b.
(InsertLeft t2 (t a), Monoid (t2 (t a)), InsertLeft t2 c,
Monoid (t2 c), Ord c) =>
FuncRep2 (t a) b c -> t2 (t a) -> (t2 (t a), t2 (t a))
innerPartitioning FuncRep2 (t a) b c
frep2 t2 (t a)
dataF
maximumGroupsClassification1
:: (InsertLeft t2 (t a), Monoid (t2 (t a)), Ord c, InsertLeft t2 c, Monoid (t2 c), Integral d) => d
-> FuncRep2 (t a) b c
-> t2 (t a)
-> (t2 (t a), t2 (t a))
maximumGroupsClassification1 :: d -> FuncRep2 (t a) b c -> t2 (t a) -> (t2 (t a), t2 (t a))
maximumGroupsClassification1 !d
nGroups !FuncRep2 (t a) b c
frep2 t2 (t a)
data0
| t2 (t a) -> Bool
forall (t :: * -> *) a. Foldable t => t a -> Bool
F.null t2 (t a)
data0 = (t2 (t a)
forall a. Monoid a => a
mempty,t2 (t a)
forall a. Monoid a => a
mempty)
| d
nGroups d -> d -> Bool
forall a. Ord a => a -> a -> Bool
<= d
0 = FuncRep2 (t a) b c -> t2 (t a) -> (t2 (t a), t2 (t a))
forall (t2 :: * -> *) (t :: * -> *) a c b.
(InsertLeft t2 (t a), Monoid (t2 (t a)), InsertLeft t2 c,
Monoid (t2 c), Ord c) =>
FuncRep2 (t a) b c -> t2 (t a) -> (t2 (t a), t2 (t a))
innerPartitioning FuncRep2 (t a) b c
frep2 t2 (t a)
data0
| Bool
otherwise = d
-> FuncRep2 (t a) b c
-> (t2 (t a), t2 (t a))
-> (t2 (t a), t2 (t a))
forall (t2 :: * -> *) (t :: * -> *) a c d b.
(InsertLeft t2 (t a), Monoid (t2 (t a)), Ord c, InsertLeft t2 c,
Monoid (t2 c), Integral d) =>
d
-> FuncRep2 (t a) b c
-> (t2 (t a), t2 (t a))
-> (t2 (t a), t2 (t a))
maximumGroupsClassification (d
nGroups d -> d -> d
forall a. Num a => a -> a -> a
- d
1) FuncRep2 (t a) b c
frep2 ((t2 (t a), t2 (t a)) -> (t2 (t a), t2 (t a)))
-> (t2 (t a) -> (t2 (t a), t2 (t a)))
-> t2 (t a)
-> (t2 (t a), t2 (t a))
forall b c a. (b -> c) -> (a -> b) -> a -> c
. FuncRep2 (t a) b c -> t2 (t a) -> (t2 (t a), t2 (t a))
forall (t2 :: * -> *) (t :: * -> *) a c b.
(InsertLeft t2 (t a), Monoid (t2 (t a)), InsertLeft t2 c,
Monoid (t2 c), Ord c) =>
FuncRep2 (t a) b c -> t2 (t a) -> (t2 (t a), t2 (t a))
innerPartitioning FuncRep2 (t a) b c
frep2 (t2 (t a) -> (t2 (t a), t2 (t a)))
-> t2 (t a) -> (t2 (t a), t2 (t a))
forall a b. (a -> b) -> a -> b
$ t2 (t a)
data0
maximumGroupsClassificationR2
:: (InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)), Ord c, InsertLeft t2 c, Monoid (t2 c), Integral d) => d
-> (t2 (Result t a b c), t2 (Result t a b c))
-> (t2 (Result t a b c), t2 (Result t a b c))
maximumGroupsClassificationR2 :: d
-> (t2 (Result t a b c), t2 (Result t a b c))
-> (t2 (Result t a b c), t2 (Result t a b c))
maximumGroupsClassificationR2 !d
nGroups (t2 (Result t a b c)
dataT,t2 (Result t a b c)
dataF)
| t2 (Result t a b c) -> Bool
forall (t :: * -> *) a. Foldable t => t a -> Bool
F.null t2 (Result t a b c)
dataF = (t2 (Result t a b c)
dataT,t2 (Result t a b c)
forall a. Monoid a => a
mempty)
| d
nGroups d -> d -> Bool
forall a. Ord a => a -> a -> Bool
<= d
0 = (t2 (Result t a b c)
dataT,t2 (Result t a b c)
dataF)
| Bool
otherwise = d
-> (t2 (Result t a b c), t2 (Result t a b c))
-> (t2 (Result t a b c), t2 (Result t a b c))
forall (t2 :: * -> *) (t :: * -> *) a b c d.
(InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)),
Ord c, InsertLeft t2 c, Monoid (t2 c), Integral d) =>
d
-> (t2 (Result t a b c), t2 (Result t a b c))
-> (t2 (Result t a b c), t2 (Result t a b c))
maximumGroupsClassificationR2 (d
nGroups d -> d -> d
forall a. Num a => a -> a -> a
- d
1) (t2 (Result t a b c)
dataT t2 (Result t a b c) -> t2 (Result t a b c) -> t2 (Result t a b c)
forall a. Monoid a => a -> a -> a
`mappend` t2 (Result t a b c)
partT,t2 (Result t a b c)
partF)
where (!t2 (Result t a b c)
partT,!t2 (Result t a b c)
partF) = t2 (Result t a b c) -> (t2 (Result t a b c), t2 (Result t a b c))
forall (t2 :: * -> *) (t :: * -> *) a b c.
(InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)),
InsertLeft t2 c, Monoid (t2 c), Ord c) =>
t2 (Result t a b c) -> (t2 (Result t a b c), t2 (Result t a b c))
innerPartitioningR t2 (Result t a b c)
dataF
maximumGroupsClassificationR
:: (InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)), InsertLeft t2 c, Monoid (t2 c), Ord c, Integral d) => d
-> t2 (Result t a b c)
-> (t2 (Result t a b c), t2 (Result t a b c))
maximumGroupsClassificationR :: d
-> t2 (Result t a b c)
-> (t2 (Result t a b c), t2 (Result t a b c))
maximumGroupsClassificationR !d
nGroups t2 (Result t a b c)
dataR
| t2 (Result t a b c) -> Bool
forall (t :: * -> *) a. Foldable t => t a -> Bool
F.null t2 (Result t a b c)
dataR = (t2 (Result t a b c)
forall a. Monoid a => a
mempty,t2 (Result t a b c)
forall a. Monoid a => a
mempty)
| d
nGroups d -> d -> Bool
forall a. Ord a => a -> a -> Bool
<= d
0 = t2 (Result t a b c) -> (t2 (Result t a b c), t2 (Result t a b c))
forall (t2 :: * -> *) (t :: * -> *) a b c.
(InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)),
InsertLeft t2 c, Monoid (t2 c), Ord c) =>
t2 (Result t a b c) -> (t2 (Result t a b c), t2 (Result t a b c))
innerPartitioningR t2 (Result t a b c)
dataR
| Bool
otherwise = d
-> (t2 (Result t a b c), t2 (Result t a b c))
-> (t2 (Result t a b c), t2 (Result t a b c))
forall (t2 :: * -> *) (t :: * -> *) a b c d.
(InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)),
Ord c, InsertLeft t2 c, Monoid (t2 c), Integral d) =>
d
-> (t2 (Result t a b c), t2 (Result t a b c))
-> (t2 (Result t a b c), t2 (Result t a b c))
maximumGroupsClassificationR2 (d
nGroups d -> d -> d
forall a. Num a => a -> a -> a
- d
1) ((t2 (Result t a b c), t2 (Result t a b c))
-> (t2 (Result t a b c), t2 (Result t a b c)))
-> (t2 (Result t a b c)
-> (t2 (Result t a b c), t2 (Result t a b c)))
-> t2 (Result t a b c)
-> (t2 (Result t a b c), t2 (Result t a b c))
forall b c a. (b -> c) -> (a -> b) -> a -> c
. t2 (Result t a b c) -> (t2 (Result t a b c), t2 (Result t a b c))
forall (t2 :: * -> *) (t :: * -> *) a b c.
(InsertLeft t2 (Result t a b c), Monoid (t2 (Result t a b c)),
InsertLeft t2 c, Monoid (t2 c), Ord c) =>
t2 (Result t a b c) -> (t2 (Result t a b c), t2 (Result t a b c))
innerPartitioningR (t2 (Result t a b c) -> (t2 (Result t a b c), t2 (Result t a b c)))
-> t2 (Result t a b c)
-> (t2 (Result t a b c), t2 (Result t a b c))
forall a b. (a -> b) -> a -> b
$ t2 (Result t a b c)
dataR
toResultR
:: FuncRep2 (t a) b c
-> t a
-> Result t a b c
toResultR :: FuncRep2 (t a) b c -> t a -> Result t a b c
toResultR !FuncRep2 (t a) b c
frep2 !t a
ys = R :: forall (t :: * -> *) a b c. t a -> b -> c -> Result t a b c
R { line :: t a
line = t a
ys, propertiesF :: b
propertiesF = b
m, transPropertiesF :: c
transPropertiesF = c
tm}
where !m :: b
m = FuncRep2 (t a) b c -> t a -> b
forall a b c. FuncRep2 a b c -> a -> b
getAB FuncRep2 (t a) b c
frep2 t a
ys
!tm :: c
tm = FuncRep2 (t a) b c -> b -> c
forall a b c. FuncRep2 a b c -> b -> c
getBC FuncRep2 (t a) b c
frep2 b
m
toPropertiesF'
:: FuncRep2 (t a) b c
-> t a
-> b
toPropertiesF' :: FuncRep2 (t a) b c -> t a -> b
toPropertiesF' !FuncRep2 (t a) b c
frep2 !t a
ys = FuncRep2 (t a) b c -> t a -> b
forall a b c. FuncRep2 a b c -> a -> b
getAB FuncRep2 (t a) b c
frep2 t a
ys
toTransPropertiesF'
:: FuncRep2 (t a) b c
-> t a
-> c
toTransPropertiesF' :: FuncRep2 (t a) b c -> t a -> c
toTransPropertiesF' !FuncRep2 (t a) b c
frep2 !t a
ys = FuncRep2 (t a) b c -> t a -> c
forall a b c. FuncRep2 a b c -> a -> c
getAC FuncRep2 (t a) b c
frep2 t a
ys