Having briefly looked at Haskell recently, what would be a brief, succinct, practical explanation as to what a monad essentially is?
I have found most explanations I've come across to be fairly inaccessible and lacking in practical detail.
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Having briefly looked at Haskell recently, what would be a brief, succinct, practical explanation as to what a monad essentially is?
I have found most explanations I've come across to be fairly inaccessible and lacking in practical detail.
Let the below "{ a m}
" represent some piece of monadic data. A data type which advertises an a
:
(I got an a!)
/
{ a m}
Function, f
, knows how to create a monad, if only it had an a
:
(Hi f! What should I be?)
/
(You?. Oh, you'll be /
that data there.) /
/ / (I got a b.)
  
 / 
f a 
later> { b m}
Here we see function, f
, tries to evaluate a monad but gets rebuked.
(Hmm, how do I get that a?)
o (Get lost buddy.
o Wrong type.)
o /
f { a m}
Funtion, f
, finds a way to extract the a
by using >>=
.
(Muaahaha. How you
like me now!?)
(Better.) \
 (Give me that a.)
(Fine, well ok.) 
\ 
{ a m} >>= f
Little does f
know, the monad and >>=
are in collusion.
(Yah got an a for me?)
(Yeah, but hey 
listen. I got 
something to 
tell you first 
...) \ /
 /
{ a m} >>= f
But what do they actually talk about? Well, that depends on the monad. Talking solely in the abstract has limited use; you have to have some experience with particular monads to flesh out the understanding.
For instance, the data type Maybe
data Maybe a = Nothing  Just a
has a monad instance which will acts like the following...
Wherein, if the case is Just a
(Yah what is it?)
(... hm? Oh, 
forget about it. 
Hey a, yr up.) 
\ 
(Evaluation \ 
time already? \ 
Hows my hair?)  
 / 
 (It's 
 fine.) /
 / /
{ a m} >>= f
But for the case of Nothing
(Yah what is it?)
(... There 
is no a. ) 
 (No a?)
(No a.) 
 (Ok, I'll deal
 with this.)
\ 
\ (Hey f, get lost.)
\  ( Where's my a?
\  I evaluate a)
\ (Not any more 
\ you don't. 
 We're returning
 Nothing.) /
  /
  /
  /
{ a m} >>= f (I got a b.)
 (This is \
 such a \
 sham.) o o \
 o
later> { b m}
So the Maybe monad lets a computation continue if it actually contains the a
it advertises, but aborts the computation if it doesn't. The result, however is still a piece of monadic data, though not the output of f
. For this reason, the Maybe monad is used to represent the context of failure.
Different monads behave differently. Lists are other types of data with monadic instances. They behave like the following:
(Ok, here's your a. Well, its
a bunch of them, actually.)

 (Thanks, no problem. Ok
 f, here you go, an a.)
 
  (Thank's. See
  you later.)
 (Whoa. Hold up f, 
 I got another 
 a for you.) 
  (What? No, sorry.
  Can't do it. I
  have my hands full
  with all these "b"
  I just made.)
 (I'll hold those, 
 you take this, and /
 come back for more /
 when you're done /
 and we'll do it /
 again.) /
\  ( Uhhh. All right.)
\  /
\ \ /
{ a m} >>= f
In this case, the function knew how to make a list from it's input, but didn't know what to do with extra input and extra lists. The bind >>=
, helped f
out by combining the multiple outputs. I include this example to show that while >>=
is responsible for extracting a
, it also has access to the eventual bound output of f
. Indeed, it will never extract any a
unless it knows the eventual output has the same type of context.
There are other monads which are used to represent different contexts. Here's some characterizations of a few more. The IO
monad doesn't actually have an a
, but it knows a guy and will get that a
for you. The State st
monad has a secret stash of st
that it will pass to f
under the table, even though f
just came asking for an a
. The Reader r
monad is similar to State st
, although it only lets f
look at r
.
The point in all this is that any type of data which is declared itself to be a Monad is declaring some sort of context around extracting a value from the monad. The big gain from all this? Well, its easy enough to couch a calculation with some sort of context. It can get messy, however, when stringing together multiple context laden calculations. The monad operations take care of resolving the interactions of context so that the programmer doesn't have to.
Note, that use of the >>=
eases a mess by by taking some of the autonomy away from f
. That is, in the above case of Nothing
for instance, f
no longer gets to decide what to do in the case of Nothing
; it's encoded in >>=
. This is the trade off. If it was necessary for f
to decide what to do in the case of Nothing
, then f
should have been a function from Maybe a
to Maybe b
. In this case, Maybe
being a monad is irrelevant.
Note, however, that sometimes a data type does not export it's constructors (looking at you IO), and if we want to work with the advertised value we have little choice but to work with it's monadic interface.
Explaining monads seems to be like explaining controlflow statements. Imagine that a nonprogrammer asks you to explain them?
You can give them an explanation involving the theory  Boolean Logic, register values, pointers, stacks, and frames. But that would be crazy.
You could explain them in terms of the syntax. Basically all controlflow statements in C have curly brackets, and you can distinguish the condition and the conditional code by where they are relative to the brackets. That may be even crazier.
Or you could also explain loops, if statements, routines, subroutines, and possibly coroutines.
Monads can replace a fairly large number of programming techniques. There's a specific syntax in languages that support them, and some theories about them.
They are also a way for functional programmers to use imperative code without actually admitting it, but that's not their only use.
Princess's explanation of F# Computation Expressions helped me, though I still can't say I've really understood.
EDIT: this series  explaining monads with javascript  is the one that 'tipped the balance' for me.
http://blog.jcoglan.com/2011/03/06/monadsyntaxforjavascript/
http://blog.jcoglan.com/2011/03/11/promisesarethemonadofasynchronousprogramming/
I think that understanding monads is something that creeps up on you. In that sense, reading as many 'tutorials' as you can is a good idea, but often strange stuff (unfamiliar language or syntax) prevents your brain from concentrating on the essential.
Some things that I had difficulty understanding:
a > M<a>
) and Bind (M<a> > (a > M<b>) > M<b>
) are great, but what I could never understand is HOW Bind could extract the a
from M<a>
in order to pass it into a > M<b>
. I don't think I've ever read anywhere (maybe it's obvious to everyone else), that the reverse of Return (M<a> > a
) has to exist inside the monad, it just doesn't need to be exposed.>>=
has access to the internals of the monad. For example see Maybe Monad and look for instance Monad Maybe
. You'll see that when the left hand side is Just x
then we return k x
. The pattern matching does the unwrap for you. Something analogous happens in every monad implementation.
– Michael Welch
Feb 3 '15 at 16:59
I'm trying to understand monads as well. It's my version:
Monads are about making abstractions about repetitive things. Firstly, monad itself is a typed interface (like an abstract generic class), that has two functions: bind and return that have defined signatures. And then, we can create concrete monads based on that abstract monad, of course with specific implementations of bind and return. Additionally, bind and return must fulfill a few invariants in order to make it possible to compose/chain concrete monads.
Why create the monad concept while we have interfaces, types, classes and other tools to create abstractions? Because monads give more: they enforce rethinking problems in a way that enables to compose data without any boilerplate.
Essentially, and Practically, monads allow callback nesting
(with a mutuallyrecursivelythreaded state (pardon the hyphens))
(in a composable (or decomposable) fashion)
(with type safety (sometimes (depending on the language)))
)))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))))
E.G. this is NOT a monad:
//JavaScript is 'Practical'
var getAllThree =
bind(getFirst, function(first){
return bind(getSecond,function(second){
return bind(getThird, function(third){
var fancyResult = // And now make do fancy
// with first, second,
// and third
return RETURN(fancyResult);
});});});
But monads enable such code.
The monad is actually the set of types for:
{bind,RETURN,maybe others I don't know...}
.
Which is essentially inessential, and practically impractical.
So now I can use it:
var fancyResultReferenceOutsideOfMonad =
getAllThree(someKindOfInputAcceptableToOurGetFunctionsButProbablyAString);
//Ignore this please, throwing away types, yay JavaScript:
// RETURN = K
// bind = \getterFn,cb >
// \in > let(result,newState) = getterFn(in) in cb(result)(newState)
Or Break it up:
var getFirstTwo =
bind(getFirst, function(first){
return bind(getSecond,function(second){
var fancyResult2 = // And now make do fancy
// with first and second
return RETURN(fancyResult2);
});})
, getAllThree =
bind(getFirstTwo, function(fancyResult2){
return bind(getThird, function(third){
var fancyResult3 = // And now make do fancy
// with fancyResult2,
// and third
return RETURN(fancyResult3);
});});
Or ignore certain results:
var getFirstTwo =
bind(getFirst, function(first){
return bind(getSecond,function(second){
var fancyResult2 = // And now make do fancy
// with first and second
return RETURN(fancyResult2);
});})
, getAllThree =
bind(getFirstTwo, function(____dontCare____NotGonnaUse____){
return bind(getThird, function(three){
var fancyResult3 = // And now make do fancy
// with `three` only!
return RETURN(fancyResult3);
});});
Or simplify a trivial case from:
var getFirstTwo =
bind(getFirst, function(first){
return bind(getSecond,function(second){
var fancyResult2 = // And now make do fancy
// with first and second
return RETURN(fancyResult2);
});})
, getAllThree =
bind(getFirstTwo, function(_){
return bind(getThird, function(three){
return RETURN(three);
});});
To (using "Right Identity"):
var getFirstTwo =
bind(getFirst, function(first){
return bind(getSecond,function(second){
var fancyResult2 = // And now make do fancy
// with first and second
return RETURN(fancyResult2);
});})
, getAllThree =
bind(getFirstTwo, function(_){
return getThird;
});
Or jam them back together:
var getAllThree =
bind(getFirst, function(first_dontCareNow){
return bind(getSecond,function(second_dontCareNow){
return getThird;
});});
The practicality of these abilities doesn't really emerge,
or become clear until you try to solve really messy problems
like parsing, or module/ajax/resource loading.
Can you imagine thousands of lines of indexOf/subString logic?
What if frequent parsing steps were contained in little functions?
Functions like chars
, spaces
,upperChars
, or digits
?
And what if those functions gave you the result in a callback,
without having to mess with Regex groups, and arguments.slice?
And what if their composition/decomposition was well understood?
Such that you could build big parsers from the bottom up?
So the ability to manage nested callback scopes is incredibly practical,
especially when working with monadic parser combinator libraries.
(that is to say, in my experience)
DON'T GET HUNG UP ON:
 CATEGORYTHEORY
 MAYBEMONADS
 MONAD LAWS
 HASKELL
 !!!!
Another attempt at explaining monads, using just Python lists and the map
function. I fully accept this isn't a full explanation, but I hope it gets at the core concepts.
I got the basis of this from the funfunfunction video on Monads and the Learn You A Haskell chapter 'For a Few Monads More'. I highly recommend watching the funfunfunction video.
At it's very simplest, Monads are objects that have a map
and flatMap
functions (bind
in Haskell). There are some extra required properties, but these are the core ones.
flatMap
'flattens' the output of map, for lists this just concatenates the values of the list e.g.
concat([[1], [4], [9]]) = [1, 4, 9]
So in Python we can very basically implement a Monad with just these two functions:
def flatMap(func, lst):
return concat(map(func, lst))
def concat(lst):
return sum(lst, [])
func
is any function that takes a value and returns a list e.g.
lambda x: [x*x]
For clarity I created the concat
function in Python via a simple function, which sums the lists i.e. [] + [1] + [4] + [9] = [1, 4, 9]
(Haskell has a native concat
method).
I'm assuming you know what the map
function is e.g.:
>>> list(map(lambda x: [x*x], [1,2,3]))
[[1], [4], [9]]
Flattening is the key concept of Monads and for each object which is a Monad this flattening allows you to get at the value that is wrapped in the Monad.
Now we can call:
>>> flatMap(lambda x: [x*x], [1,2,3])
[1, 4, 9]
This lambda is taking a value x and putting it into a list. A monad works with any function that goes from a value to a type of the monad, so a list in this case.
That's your monad defined.
I think the question of why they're useful has been answered in other questions.
Other examples that aren't lists are JavaScript Promises, which have the then
method and JavaScript Streams which have a flatMap
method.
So Promises and Streams use a slightly different function which flattens out a Stream or a Promise and returns the value from within.
The Haskell list monad has the following definition:
instance Monad [] where
return x = [x]
xs >>= f = concat (map f xs)
fail _ = []
i.e. there are three functions return
(not to be confused with return in most other languages), >>=
(the flatMap
) and fail
.
Hopefully you can see the similarity between:
xs >>= f = concat (map f xs)
and:
def flatMap(f, xs):
return concat(map(f, xs))
See the following slide decks for an attempt to answer that question from a single angle at a time, the focus being on Scala:
http://mikehadlow.blogspot.com/2011/02/monadsinc8videoofmyddd9monad.html
This is the video you are looking for.
Demonstrating in C# what the problem is with composition and aligning the types, and then implementing them properly in C#. Towards the end he displays how the same C# code looks in F# and finally in Haskell.
In the Coursera "Principles of Reactive Programming" training  Erik Meier describes them as:
"Monads are return types that guide you through the happy path." Erik Meijer
Mathematial thinking
For short: An Algebraic Structure for Combining Computations.
return data
: create a computation who just simply generate a data in monad world.
(return data) >>= (return func)
: The second parameter accept first parameter as a data generator and create a new computations which concatenate them.
You can think that (>>=) and return won't do any computation itself. They just simply combine and create computations.
Any monad computation will be compute if and only if main trigs it.
A Monad
is an Applicative
(i.e. something that you can lift binary  hence, "nary"  functions to,^{(1)} and inject pure values into^{(2)}) Functor
(i.e. something that you can map over,^{(3)} i.e. lift unary functions to^{(3)}) with the added ability to flatten the nested datatype (with each of the three notions following its corresponding set of laws). In Haskell, this flattening operation is called join
.
The general (generic, parametric) type of this "join
" operation is:
join :: Monad m => m (m a) > m a
for any monad m
(NB all m
s in the type are the same!).
A specific m
monad defines its specific version of join
working for any value type a
"carried" by the monadic values of type m a
. Some specific types are:
join :: [[a]] > [a]  for lists, or nondeterministic values
join :: Maybe (Maybe a) > Maybe a  for Maybe, or optional values
join :: IO (IO a) > IO a  for I/Oproduced values
The join
operation converts an m
computation producing an m
computation of a
type values into one combined m
computation of a
type values. This allows for combination of computation steps into one larger computation.
This computation stepscombining "bind" (>>=
) operator simply uses fmap
and join
together, i.e.
(ma >>= k) == join (fmap k ma)
{
ma :: m a  `m`computation which produces `a`type values
k :: a > m b  create new `m`computation from an `a`type value
fmap k ma :: m ( m b )  `m`computation of `m`computation of `b`type values
(m >>= k) :: m b  `m`computation which produces `b`type values
}
Conversely, join
can be defined via bind, join mma == join (fmap id mma) == mma >>= id
where id ma = ma
 whichever is more convenient for a given type m
.
For monads, both the do
notation and its equivalent bindusing code,
do { x < mx ; y < my ; return (f x y) }  x :: a , mx :: m a
 y :: b , my :: m b
mx >>= (\x >  nested
my >>= (\y >  lambda
return (f x y) ))  functions
can be read as
first "do"
mx
, and when it's done, get its "result" asx
and let me use it to "do" something else.
In a given do
block, each of the values to the right of the binding arrow <
is of type m a
for some type a
and the same monad m
throughout the do
block.
return x
is a neutral m
computation which just produces the pure value x
it is given, such that binding any m
computation with return
does not change that computation at all.
^{(1)} with liftA2 :: Applicative m => (a > b > c) > m a > m b > m c
^{(2)} with pure :: Applicative m => a > m a
^{(3)} with fmap :: Functor m => (a > b) > m a > m b
There's also the equivalent Monad methods,
liftM2 :: Monad m => (a > b > c) > m a > m b > m c
return :: Monad m => a > m a
liftM :: Monad m => (a > b) > m a > m b
Given a monad, the other definitions could be made as
pure a = return a
fmap f ma = do { a < ma ; return (f a) }
liftA2 f ma mb = do { a < ma ; b < mb ; return (f a b) }
(ma >>= k) = do { a < ma ; b < k a ; return b }
If you are asking for a succinct, practical explanation for something so abstract, then you can only hope for an abstract answer:
a > b
is one way of representing a computation from a
s to b
s. You can chain computations, aka compose them together:
(b > c) > (a > b) > (a > c)
More complex computations demand more complex types, e.g.:
a > f b
is the type of computations from a
s to b
s that are into f
s. You can also compose them:
(b > f c) > (a > f b) > (a > f c)
It turns out this pattern appears literally everywhere and has the same properties as the first composition above (associativity, right and leftidentity).
One had to give this pattern a name, but then would it help to know that the first composition is formally characterised as a Semigroupoid?
"Monads are just as interesting and important as parentheses" (Oleg Kiselyov)
A Monad is a box with a special machine attached that allows you to make one normal box out of two nested boxes  but still retaining some of the shape of both boxes.
Concretely, it allows you to perform join
, of type Monad m => m (m a) > m a
.
It also needs a return
action, which just wraps a value. return :: Monad m => a > m a
You could also say join
unboxes and return
wraps  but join
is not of type Monad m => m a > a
(It doesn't unwrap all Monads, it unwraps Monads with Monads inside of them.)
So it takes a Monad box (Monad m =>
, m
) with a box inside it ((m a)
) and makes a normal box (m a
).
However, usually a Monad is used in terms of the (>>=)
(spoken "bind") operator, which is essentially just fmap
and join
after each other. Concretely,
x >>= f = join (fmap f x)
(>>=) :: Monad m => (a > m b) > m a > m b
Note here that the function comes in the second argument, as opposed to fmap
.
Also, join = (>>= id)
.
Now why is this useful? Essentially, it allows you to make programs that string together actions, while working in some sort of framework (the Monad).
The most prominent use of Monads in Haskell is the IO
Monad.
Now, IO
is the type that classifies an Action in Haskell. Here, the Monad system was the only way of preserving (big fancy words):
In essence, an IO action such as getLine :: IO String
can't be replaced by a String, as it always has a different type. Think of IO
as a sort of magical box that teleports the stuff to you.
However, still just saying that getLine :: IO String
and all functions accept IO a
causes mayhem as maybe the functions won't be needed. What would const "üp§" getLine
do? (const
discards the second argument. const a b = a
.) The getLine
doesn't need to be evaluated, but it's supposed to do IO! This makes the behaviour rather unpredictable  and also makes the type system less "pure", as all functions would take a
and IO a
values.
Enter the IO
Monad.
To string to actions together, you just flatten the nested actions.
And to apply a function to the output of the IO action, the a
in the IO a
type, you just use (>>=)
.
As an example, to output an entered line (to output a line is a function which produces an IO action, matching the right argument of >>=
):
getLine >>= putStrLn :: IO ()
 putStrLn :: String > IO ()
This can be written more intuitively with the do
environment:
do line < getLine
putStrLn line
In essence, a do
block like this:
do x < a
y < b
z < f x y
w < g z
h x
k < h z
l k w
... gets transformed into this:
a >>= \x >
b >>= \y >
f x y >>= \z >
g z >>= \w >
h x >>= \_ >
h z >>= \k >
l k w
There's also the >>
operator for m >>= \_ > f
(when the value in the box isn't needed to make the new box in the box)
It can also be written a >> b = a >>= const b
(const a b = a
)
Also, the return
operator is modeled after the IOintuituion  it returns a value with minimal context, in this case no IO. Since the a
in IO a
represents the returned type, this is similar to something like return(a)
in imperative programming languages  but it does not stop the chain of actions! f >>= return >>= g
is the same as f >>= g
. It's only useful when the term you return has been created earlier in the chain  see above.
Of course, there are other Monads, otherwise it wouldn't be called Monad, it'd be called somthing like "IO Control".
For example, the List Monad (Monad []
) flattens by concatenating  making the (>>=)
operator perform a function on all elements of a list. This can be seen as "indeterminism", where the List is the many possible values and the Monad Framework is making all the possible combinations.
For example (in GHCi):
Prelude> [1, 2, 3] >>= replicate 3  Simple binding
[1, 1, 1, 2, 2, 2, 3, 3, 3]
Prelude> concat (map (replicate 3) [1, 2, 3])  Same operation, more explicit
[1, 1, 1, 2, 2, 2, 3, 3, 3]
Prelude> [1, 2, 3] >> "uq"
"uququq"
Prelude> return 2 :: [Int]
[2]
Prelude> join [[1, 2], [3, 4]]
[1, 2, 3, 4]
because:
join a = concat a
a >>= f = join (fmap f a)
return a = [a]  or "= (:[])"
The Maybe Monad just nullifies all results to Nothing
if that ever occurs.
That is, binding autochecks if the function (a >>=
f
) returns or the value (a
>>= f
) is Nothing
 and then returns Nothing
as well.
join Nothing = Nothing
join (Just Nothing) = Nothing
join (Just x) = x
a >>= f = join (fmap f a)
or, more explicitly:
Nothing >>= _ = Nothing
(Just x) >>= f = f x
The State Monad is for functions that also modify some shared state  s > (a, s)
, so the argument of >>=
is :: a > s > (a, s)
.
The name is a sort of misnomer, since State
really is for statemodifying functions, not for the state  the state itself really has no interesting properties, it just gets changed.
For example:
pop :: [a] > (a , [a])
pop (h:t) = (h, t)
sPop = state pop  The module for State exports no State constructor,
 only a state function
push :: a > [a] > ((), [a])
push x l = ((), x : l)
sPush = state push
swap = do a < sPop
b < sPop
sPush a
sPush b
get2 = do a < sPop
b < sPop
return (a, b)
getswapped = do swap
get2
then:
Main*> runState swap [1, 2, 3]
((), [2, 1, 3])
Main*> runState get2 [1, 2, 3]
((1, 2), [1, 2, 3]
Main*> runState (swap >> get2) [1, 2, 3]
((2, 1), [2, 1, 3])
Main*> runState getswapped [1, 2, 3]
((2, 1), [2, 1, 3])
also:
Prelude> runState (return 0) 1
(0, 1)
According to What we talk about when we talk about monads the question "What is a monad" is wrong:
The short answer to the question "What is a monad?" is that it is a monoid in the category of endofunctors or that it is a generic data type equipped with two operations that satisfy certain laws. This is correct, but it does not reveal an important bigger picture. This is because the question is wrong. In this paper, we aim to answer the right question, which is "What do authors really say when they talk about monads?"
While that paper does not directly answer what a monad is it helps understanding what people with different backgrounds mean when they talk about monads and why.
It's quite simple, when explained in C#/Java terms:
A monad is a function that takes arguments and returns a special type.
The special type that this monad returns is also called monad. (A monad is a combination of #1 and #2)
There's some syntactic sugar to make calling this function and conversion of types easier.
A monad is useful to make the life of the functional programmer easier. The typical example: The Maybe
monad takes two parameters, a value and a function. It returns null
if the passed value is null
. Otherwise it evaluates the function. If we needed a special return type, we would call this return type Maybe
as well. A very crude implementation would look like this:
object Maybe(object value, Func<object,object> function)
{
if(value==null)
return null;
return function(value);
}
This is spectacularly useless in C# because this language lacks the required syntactic sugar to make monads useful. But monads allow you to write more concise code in functional programming languages.
Oftentimes programmers call monads in chains, like so:
var x = Maybe(x, x2 => Maybe(y, y2 => Add(x2, y2)));
In this example the Add
method would only be called if x
and y
are both nonnull
, otherwise null
will be returned.
To answer the original question: A monad is a function AND a type. Like an implementation of a special interface
.
following your brief, succinct, practical indications:
The easiest way to understand a monad is as a way to apply/compose functions within a context. Let's say you have two computations which both can be seen as two mathematical functions f
and g
.
f
takes a String and produces another String (take the first two letters)g
takes a String and produces another String (upper case transformation)So in any language the transformation "take the first two letter and convert them to upper case" would be written g(f("some string")). So, in the world of pure perfect functions, composition is just: do one thing and then do the other.
But let's say we live in the world of functions which can fail. For example: the input string might be one char long so f would fail. So in this case
f
takes a String and produces a String or Nothing. g
produces a String only if f hasn't failed. Otherwise, produces Nothing So now, g(f("some string")) needs some extra checking: "Compute f
, if it fails then g
should return Nothing, else compute g"
This idea can be applied to any parametrized type as follows:
Let Context[Sometype] be a computation of Sometype within a Context. Considering functions
f:: AnyType > Context[Sometype]
g:: Sometype > Context[AnyOtherType]
the composition g(f()) should be readed as "compute f. Within this context do some extra computations and then compute g if it has sense within the context"