An alternative constructor for LawfulMonad
which has more
defaultable fields in the common case.
Equations
- (_ : LawfulMonad (Except ε)) = (_ : LawfulMonad (Except ε))
Equations
- (_ : LawfulApplicative (Except ε)) = (_ : LawfulApplicative (Except ε))
Equations
- (_ : LawfulFunctor (Except ε)) = (_ : LawfulFunctor (Except ε))
Equations
Equations
- (_ : LawfulMonad (EStateM ε σ)) = (_ : LawfulMonad (EStateM ε σ))
SatisfiesM #
The SatisfiesM
predicate works over an arbitrary (lawful) monad / applicative / functor,
and enables Hoare-like reasoning over monadic expressions. For example, given a monadic
function f : α → m β
, to say that the return value of f
satisfies Q
whenever
the input satisfies P
, we write ∀ a, P a → SatisfiesM Q (f a)
.
SatisfiesM p (x : m α)
lifts propositions over a monad. It asserts that x
may as well
have the type x : m {a // p a}
, because there exists some m {a // p a}
whose image is x
.
So p
is the postcondition of the monadic value.
Equations
- SatisfiesM p x = ∃ (x' : m { a : α // p a }), Subtype.val <$> x' = x
Instances For
If p
is always true, then every x
satisfies it.
If p
is always true, then every x
satisfies it.
(This is the strongest postcondition version of of_true
.)
The SatisfiesM p x
predicate is monotonic in p
.
SatisfiesM
distributes over <$>
, general version.
SatisfiesM
distributes over <$>
, strongest postcondition version.
(Use this for reasoning forward from assumptions.)
SatisfiesM
distributes over <$>
, weakest precondition version.
(Use this for reasoning backward from the goal.)
SatisfiesM
distributes over mapConst
, general version.
SatisfiesM
distributes over pure
, general version / weakest precondition version.
SatisfiesM
distributes over <*>
, general version.
SatisfiesM
distributes over <*>
, strongest postcondition version.
SatisfiesM
distributes over <*>
, weakest precondition version 1.
(Use this when x
and the goal are known and f
is a subgoal.)
SatisfiesM
distributes over <*>
, weakest precondition version 2.
(Use this when f
and the goal are known and x
is a subgoal.)
SatisfiesM
distributes over <*
, general version.
SatisfiesM
distributes over *>
, general version.
SatisfiesM
distributes over >>=
, general version.
SatisfiesM
distributes over >>=
, weakest precondition version.