úÎ!se%      !"#$None &'=>?@AX¬type-iso!The class relation between types a and b s.t. a can be injected into b.%The following laws must be fulfilled:  Injectivity x /= y ==> (to x) /= (to y) TotalitytoN should be a total function. No cheating by it undefined for parts of the set!type-isoConverts a value of type a "losslessly" to one of type b.None=?@AXItype-isoÿÊThe class of isomorphic types, i.e. those which can be cast to each other without loss of information. Type isomorphism is an equivalence relation (reflexive, symmetric, transitive), but due to the limitations of the type system, only reflexivity is implemented for all types. Since there are no type inequality constraints, writing symmetry and transitivity instances over all types would result in overlapping instances with due to reflexivity.The following must be ensured:  Isomorphism from . to = id 7Reflexivity, symmetry and transitivity are then "free": instance Iso a a  'instance (Iso a b, Iso b c) => Iso a c ÌOut of these, only the first one (reflexivity) is actually implemented, since the other two would result in overlapping instances. We would be able to avoid this with type inequality constrains (e.g. a /~ b, a /~ c, b /~ c).type-iso Synonym for .%      !"#$%&'('type-iso-1.0.1.0-8oSDuycFFcQ4hJahMi7KLAData.Types.InjectiveData.Types.Isomorphic Injectiveto$fInjectivevSeq$fInjectiveSeqv$fInjectiveWholeRatio$fInjectiveIntegerRatio$fInjectiveNatRatio$fInjectiveNatWhole$fInjectiveNatInteger$fInjectiveNaturalRatio$fInjectiveNaturalWhole$fInjectiveNaturalInteger$fInjectiveMaybeEither$fInjectiveNatNatural$fInjectiveNaturalNat$fInjectiveIntegerWhole$fInjectiveWholeInteger$fInjective[]Text$fInjectiveText[]$fInjectiveTextText$fInjectiveTextText0$fInjective[]Text0$fInjectiveText[]0 $fInjectiveaaIsofrom $fIsovSeq $fIsoSeqv$fIsoIntegerWhole$fIsoWholeInteger $fIsoTextText$fIsoTextText0 $fIso[]Text $fIsoText[] $fIso[]Text0 $fIsoText[]0$fIsoaa