module Math.ExpPairs (optimize, LinearForm (..), RationalForm (..), IneqType (..), Constraint (..), InitPair, Path, simulateOptimize,simulateOptimize', RatioInf (..), RationalInf, OptimizeResult, optimalValue, optimalPair, optimalPath) where
import Data.Ratio
import Data.Ord
import Data.List
import Data.Monoid
import Math.ExpPairs.LinearForm
import Math.ExpPairs.Process
import Math.ExpPairs.Pair
import Math.ExpPairs.RatioInf
fracs2proj :: (Rational, Rational) -> (Integer, Integer, Integer)
fracs2proj (q, r) = (k, l, m) where
dq = denominator q
dr = denominator r
m = lcm dq dr
k = numerator q * (m `div` dq)
l = numerator r * (m `div` dr)
proj2fracs :: (Integer, Integer, Integer) -> (Rational, Rational)
proj2fracs (k, l, m) = (k%m, l%m)
evalFunctional :: [InitPair] -> [InitPair] -> [RationalForm Rational] -> [Constraint Rational] -> Path -> (RationalInf, InitPair)
evalFunctional corners interiors rfs cons path = if null rs then (InfPlus, undefined) else minimumBy (comparing fst) rs where
applyPath ips = map (evalPath path . fracs2proj . initPairToValue) ips `zip` ips
corners' = applyPath corners
interiors' = applyPath interiors
predicate (p, _) = all (checkConstraint p) cons
qs = if all predicate corners' then corners' else filter predicate interiors'
rs = map (\(p, ip) -> (maximum $ map (evalRF p) rfs, ip)) qs
checkMConstraints :: Path -> [Constraint Rational] -> Bool
checkMConstraints path = all (\con -> any (\p -> checkConstraint (evalPath path p) con ) triangleT) where
triangleT = map fracs2proj [ (0%1,1%1), (0%1,1%2), (1%2,1%2)]
data OptimizeResult = OptimizeResult {
optimalValue :: RationalInf,
optimalPair :: InitPair,
optimalPath :: Path
}
instance Show OptimizeResult where
show (OptimizeResult r' ip p) = show' r' ++ "\n" ++ show ip ++ "\t" ++ show p where
show' (Finite r) = show (fromRational r :: Double) ++ " = " ++ show r
show' r = show r
instance Eq OptimizeResult where
a==b = optimalValue a == optimalValue b
instance Ord OptimizeResult where
compare a b = compare (optimalValue a) (optimalValue b)
simulateOptimize :: Rational -> OptimizeResult
simulateOptimize r = OptimizeResult (Finite r) Corput01 mempty
simulateOptimize' :: RationalInf -> OptimizeResult
simulateOptimize' r = OptimizeResult r Corput01 mempty
optimize :: [RationalForm Rational] -> [Constraint Rational] -> OptimizeResult
optimize rfs cons = optimize' rfs cons (OptimizeResult r0 ip0 mempty) where
(r0, ip0) = evalFunctional [Corput01, Corput12] [Corput01, Corput12] rfs cons mempty
optimize' :: [RationalForm Rational] -> [Constraint Rational] -> OptimizeResult -> OptimizeResult
optimize' rfs cons ret@(OptimizeResult r _ path)
| lengthPath path > 100 = ret
| otherwise = retBA where
ret0@(OptimizeResult r0 ip0 _) = if r0' < r then OptimizeResult r0' ip0' path else ret where
(r0', ip0') = evalFunctional corners interiors rfs cons path
corners = [Mix 1 0, Mix 0 1, Mix 0 0]
interiors = initPairs
cons0 = if r0==InfPlus then cons else cons ++ map (consBuilder r0) rfs
retA@(OptimizeResult r1 ip1 _) = if checkMConstraints patha cons0 && r1' < r0 then branchA else ret0 where
patha = path `mappend` aPath
branchA@(OptimizeResult r1' _ _) = optimize' rfs cons (OptimizeResult r0 ip0 patha)
cons1 = if r1==r0 then cons0 else cons ++ map (consBuilder r1) rfs
retBA = if checkMConstraints pathba cons1 && r2' < r1 then branchB else retA where
pathba = path `mappend` baPath
branchB@(OptimizeResult r2' _ _) = optimize' rfs cons (OptimizeResult r1 ip1 pathba)
consBuilder rr (RationalForm num den) = Constraint (substituteLF (num, den, 1) (LinearForm (1) (toRational rr) 0)) Strict