numhask
Usage
{-# LANGUAGE RebindableSyntax #-}
import NumHask.Prelude
See the documentation in the NumHask module for a detailed overview.
v0.12 notes
SemiField
Compared to previous library versions, Ring and Field have been removed as super classes of QuotientField, and SemiField introduced as the new constraint.
Old version:
type SemiField a = (Distributive a, Divisive a)
class (SemiField a) => QuotientField a where
type Whole a :: Type
properFraction :: a -> (Whole a, a)
The notion of a quotient is now that which distributes and divides.
Subtractive originally slipped in as a super class due to the notion of rounding down (or, specifically, towards zero). By using DefaultSignatures, a default for Subtractive-type numbers can be provided and still allow non-Subtractive (SemiField) things to be quotient fields.
Infinity and nan move from a Field to a SemiField constraint - subtraction is not needed to come up with an infinity or silly compute.
Positive
A motivation for SemiField was to introduce NumHask.Data.Positive into the library. Positive has no sane Subtractive instance (but should be able to be rounded).
Out of the many approaches that can be taken in defining a positive number, the definition relies on a notion of truncated subtraction; that subtraction can be performed on positive numbers but, for answers outside the typed range, the lower bound should be returned.
Specifically, the positive constructor needs to be supplied with a number that has a MeetSemiLattice instance, so that complex numbers and other geometries are correctly handled:
ghci> 2 +: (-2)
Complex {complexPair = (2,-2)}
ghci> positive (2 +: (-2))
UnsafePositive {unPositive = Complex {complexPair = (2,0)}}
Truncated Arithmetic
Truncated subtraction can be generalised to a notion of truncated arithmetic on a number with a typed range. This may be a direction explored further in the library including:
- [epsilon, +infinity): A positive number type which is a safe divisor.
- /= zero, non-zero arithmetic (x - x returns epsilon, say)
- [0,1]: probability and weight arithmetic
- [-1,1]: correlation math
magnitudes are positive
The current Basis instance of Double:
instance Basis Double where
type Mag Double = Double
type Base Double = Double
magnitude = P.abs
basis = P.signum
is probably more correctly written as:
instance Basis Double where
type Mag Double = Positive Double
type Base Double = Sign Double
magnitude = Positive . P.abs
basis = Sign . P.signum
where Sign is a future-imagined type representing {-1,0,1} or {-1,1}
In Haskell, there is a basic choice between using multiple parameters for a type or embedding types using type families. Using multiple parameters would, in practice, force users to have to chose and write 'Basis Double Double Double' or 'Basis Positive Sign Double'.
On balance, a computational chain involving magnitude is likely to be a single, underlying type, so that providing a Basis instance returning a Positive would result in a lot of unwrapping.
-- endo-based
x == basis x * magnitude x
-- if hetero-typed ...
x == (unSign $ basis x) * (unPositive $ magnitude x)
The library awaits real-world feedback on safety versus ergonomics.
Monus
Truncated subtraction is encapsulated within the Monus class and supplied operator:
ghci> 4 ∸ 7 :: Positive Int
UnsafePositive {unPositive = 0}
ghci> unPositive (4 ∸ 7 :: Positive Int)
0
ghci> unPositive (7 ∸ 4 :: Positive Int)
3
NumHask.Data.Wrapped
The introduction of Positive provoked including a wrapper type for most numhask types. This type can be used with derivingvia:
newtype Positive a = UnsafePositive {unPositive :: a}
deriving stock
(Eq, Ord, Show)
deriving
( Additive,
Multiplicative,
Divisive,
Integral,
FromInteger,
FromRational,
Basis,
Direction,
Epsilon,
AdditiveAction,
SubtractiveAction,
MultiplicativeAction,
DivisiveAction,
JoinSemiLattice,
MeetSemiLattice,
BoundedMeetSemiLattice
)
via (Wrapped a)