Having briefly looked at Haskell recently I wondered whether anybody could give 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, so could somebody here help me?

In the Coursera "Principles of Reactive Programming" training  Erik Meier describes them as:



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. 


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. 


Still new to monads, but I thought I would share a link I found that felt really good to read (WITH PICTURES!!): http://www.matusiak.eu/numerodix/blog/2012/3/11/monadsforthelayman/ (no affiliation) Basically, the warm and fuzzy concept that I got from the article was the concept that monads are basically adapters that allow disparate functions to work in a composable fashion, i.e. be able to string up multiple functions and mix and match them without worrying about inconsistent return types and such. So the BIND function is in charge of keeping apples with apples and oranges with oranges when we're trying to make these adapters. And the LIFT function is in charge of taking "lower level" functions and "upgrading" them to work with BIND functions and be composable as well. Hope I got it right, and more importantly, hope that the article has a valid view on monads. If nothing else, this article helped whet my appetite for learning more about monads. 


mathematial thinking for short: An Algebraic Structure for Combining Computations.
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 trig it. 


protected by Tats_innit May 29 at 2:17
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