\[ \require{mathtools} \let\DeclarePairedDelimiter\DeclarePairedDelimiters % MathJax typo %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % symbol %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % sets \newcommand{\N}{\mathbb{N}} % natural numbers \newcommand{\Z}{\mathbb{Z}} % integers \newcommand{\Q}{\mathbb{Q}} % rational numbers \newcommand{\R}{\mathbb{R}} % real numbers \newcommand{\C}{\mathbb{C}} % complex numbers % category \newcommand{\catf}[1]{{\mathbf{#1}}} \newcommand{\cA}{\catf{A}} \newcommand{\cB}{\catf{B}} \newcommand{\cC}{\catf{C}} \newcommand{\cD}{\catf{D}} \newcommand{\cE}{\catf{E}} \newcommand{\cF}{\catf{F}} \newcommand{\cG}{\catf{G}} \newcommand{\cH}{\catf{H}} \newcommand{\cI}{\catf{I}} \newcommand{\cJ}{\catf{J}} \newcommand{\cK}{\catf{K}} \newcommand{\cL}{\catf{L}} \newcommand{\cM}{\catf{M}} \newcommand{\cN}{\catf{N}} \newcommand{\cO}{\catf{O}} \newcommand{\cP}{\catf{P}} \newcommand{\cQ}{\catf{Q}} \newcommand{\cR}{\catf{R}} \newcommand{\cS}{\catf{S}} 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\DeclareMathOperator{\fold}{fold} \DeclareMathOperator{\map}{map} \DeclareMathOperator{\filter}{filter} % bool \DeclareMathOperator{\cond}{cond} %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % order %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \newcommand{\meet}{\wedge} \newcommand{\join}{\vee} \newcommand{\bigmeet}{\bigwedge} \newcommand{\bigjoin}{\bigvee} %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % logic %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% \newcommand{\lfal}{\bot} \newcommand{\ltru}{\top} \newcommand{\lcon}{\wedge} \newcommand{\lncon}{\uparrow} \newcommand{\ldis}{\vee} \newcommand{\lndis}{\downarrow} \newcommand{\limp}{\rightarrow} \newcommand{\lnimp}{\nrightarrow} \newcommand{\lcim}{\leftarrow} \newcommand{\lncim}{\nleftarrow} \newcommand{\leqv}{\leftrightarrow} \newcommand{\lneqv}{\nleftrightarrow} \newcommand{\lproves}{\vdash} % |- \newcommand{\lmodels}{\vDash} % |= \newcommand{\lnproves}{\nvdash} % |/- \newcommand{\lnmodels}{\nvDash} % |/= \]

A monad is a structure that describes generalized objects and morphisms.

1 Monad

The category \([\cC, \cC]\) of endofunctors is a strict monoidal category with the functor composition as the monoidal product and the identity functor \(\id_\cC\) as the monoidal unit.

A monad in a category \(\cC\) is an endofunctor \(T: \cC \to \cC\) equipped with two natural transformations:

composition \(\mu: TT \nat T\)
unit \(\eta: \id_\cC \nat T\)

subject to

associativity: \(\mu (T \mu) = \mu (\mu T)\)
identity: \(\mu (\eta T) = \id_T = \mu (T \eta)\)

In other words, a monad is a monoid in the category of endofunctors.

/assets/diagrams/monad_associativity_fun.svg

/assets/diagrams/monad_associativity_str.svg

-- bind
(>>=) :: Monad m => m a -> (a -> m b) -> m b
(=<<) :: Monad m => (a -> m b) -> m a -> m b
(>>)  :: Monad m => m a -> m b -> m b
(>=>) :: Monad m => (a -> m b) -> (b -> m c) -> (a -> m c)
(<=<) :: Monad m => (b -> m c) -> (a -> m b) -> (a -> m c)

2 Algebra

2.1 F-algebra

For an endofunctor \(F: \cC \to \cC\), an algebra over an endofunctor (F-algebra) \((A, \act_A)\) consists of an object \(A\) (carrier) and a morphism \(\act_A: FA \to A\).

An F-algebra homomorphism from \((A, \act_A)\) to \((B, \act_B)\) is a morphism \(f: A \to B\) such that \(\act_B \compL Ff = f \compL \act_A\).

/assets/diagrams/F-algebra_homomorphism.svg

For an endofunctor \(F: \cC \to \cC\), a coalgebra over an endofunctor (F-coalgebra) \((A, \act_A)\) consists of an object \(A\) (carrier) and a morphism \(\act_A: A \to FA\).

An F-coalgebra homomorphism from \((A, \act_A)\) to \((B, \act_B)\) is a morphism \(f: A \to B\) such that \(\act_B \compL f = Ff \compL \act_A\).

2.1.1 Initial F-algebra

An initial F-algebra of an endofunctor \(F\) is an initial object in the category of F-algebras.

If an endofunctor \(F\) has an initial F-algebra \((\mu F, i)\), then \(F \mu F \iso \mu F\).

\((F \mu F, Fi)\) is an F-algebra, so there exists a unique F-algebra homomorphism \(u: \mu F \to F \mu F\).
\(i \compL u: \mu F \to \mu F\) is an F-algebra homomorphism from the initial F-algebra and thus is unique, \(i \compL u = \id_{\mu F}\).
\(u \compL i = Fi \compL Fu = F(i \compL u) = F \id_{\mu F} = \id_{F \mu F}\).

In a category \(\cC\) with a terminal object \(1\), a natural numbers object (NNO) \(\N\) is an initial F-algebra of the endofunctor \(X \mapsto 1 + X\).

\[\begin{aligned} \begin{array}{rccccc} & 1 &+& \N &\to& \N \\ \zero: & * && &\mapsto& 0 \\ \successor: && & n &\mapsto& n+1 \end{array} \end{aligned}\]

In a category \(\cC\) with a terminal object \(1\) and binary products, an \(A\)-valued list object \([A]\) is an initial F-algebra of the endofunctor \(X \mapsto 1 + A \times X\).

\[\begin{aligned} \begin{array}{rccccc} & 1 &+& A \times [A] &\to& [A] \\ \nil: & * && &\mapsto& [] \\ \cons: & && (x, xs) &\mapsto& x:xs \end{array} \end{aligned}\]

2.2 M-algebra

For a monoid object \((M, \mu, \eta)\) in a monoidal category \((\cC, \otimes, I, \alpha, \lambda, \rho)\), a (left) algebra over a monoid object (M-algebra) is an F-algebra \((A, \act_A: M \otimes A \to A)\) for the endofunctor

\[\begin{aligned} (M \otimes -): \cC &\to \cC \\ A &\mapsto M \otimes A \\ f &\mapsto \id_M \otimes f \end{aligned}\]

that is compatible with

monoid product: \(\act \compL (\mu \otimes \id) = \act \compL (\id \otimes \act) \compL \alpha\)
monoid unit: \(\act \compL (\eta \otimes \id) = \lambda\)

/assets/diagrams/M-algebra_associativity.svg

An M-algebra homomorphism is an F-algebra homomorphism.

/assets/diagrams/M-algebra_homomorphism.svg

2.3 T-algebra

For a monad \((T, \mu, \eta)\), a (left) algebra over a monad (T-algebra) is an M-algebra \((A, \act_A: TA \to A)\) in the category of endofunctors over the constant functor \(\Delta A\).

Thus, a T-algebra is compatible with

monad composition: \(\act_A \compL T \act_A = \act_A \compL \mu_A\)
monad unit: \(\act_A \compL \eta_A = \id_A\)

/assets/diagrams/T-algebra_composition.svg

A T-algebra homomorphism is an F-algebra homomorphism.

/assets/diagrams/T-algebra_homomorphism.svg

For a monad \((T, \mu, \eta)\) in a category \(\cC\), the Eilenberg–Moore category \(\cC^T\) is a category of T-algebras and T-algebra homomorphisms.

3 Kleisli category

For a monad \((T, \mu, \eta)\) in a category \(\cC\), the Kleisli category \(\cC_T\) is a category whose

objects are \(\cC\)-objects \(\Obj_{\cC_T} := \Obj_\cC\)
morphisms are Kleisli morphisms \(\Hom_{\cC_T}(A, B) := \Hom_\cC(A, TB)\)
composition is the Kleisli composition \(g_\Kl \compL_T f_\Kl := \mu_C \compL Tg_\Kl \compL f_\Kl\)
identity morphism is the monad unit \(\id_A := \eta_A: A \to TA\)

/assets/diagrams/Kleisli_composition.svg

4 Monadic adjunction

4.1 Adjunction to monad

An adjunction

\[(F: \cC \toot \cD: G, \epsilon: FG \nat \id_\cD, \eta: \id_\cC \nat GF)\]

gives rise to a monad

\[(GF: \cC \to \cC, G \epsilon F: GFGF \nat GF, \eta: \id_\cC \nat GF)\]

/assets/diagrams/adjunction_monad_associativity_str.svg

/assets/diagrams/adjunction_monad_identity_str.svg

and a comonad

\[(FG: \cD \to \cD, F \eta G: FG \nat FGFG, \epsilon: FG \nat \id_\cD)\]

4.2 Monad to adjunction

5 Examples

5.1 Maybe

\(MA = 1 + A\) nothing or values
\(Mf = 1 + f\) computation with failure
\(\mu: MM \nat M\) failure propagation
\(\eta: \id \nat M\) just
\(A \to MB\) partial function
\(MA \to A\) pointed object

5.2 List

free monoid

\([]: 1 \to LA\) empty list
\(\concat: LA \times LA \to LA\) concatenation

free monoid monad

\(LA\) list
\(Lf\) list map
\(\mu: LL \nat L\) concatenation
\(\eta: \id \nat L\) singleton
\(A \to LB\) list function
\(LA \to A\) monoid \((A, \fold [e: 1 \to A, \cdot: A \times A \to A])\)
- right identity \([a]\)
- left identity \([[], [a]]\)
- associativity \([[a, b], [c]]\)

5.3 Powerset

\(PA = 2^A\) powerset
\(Pf\) set map
\(\mu: PP \nat P\) union
\(\eta: \id \nat P\) singleton
\(A \to PB\) set function
\(PA \to A\) suplattice

5.4 Multiset

\(NA = \N^A\) multiset
\(Nf\) sum map
\(\mu: NN \nat N\) multiplication
\(\eta: \id \nat N\) singleton
\(A \to NB\) multiset function
\(NA \to A\) commutative monoid

5.5 Probability

\(PA\) probability measures
\(Pf\) pushforward measure
\(\mu: PP \nat P\) marginalization
\(\eta: \id \nat P\) Dirac measure
\(A \to PB\) conditional probability
\(PA \to A\) expectation

5.6 State

\([S, S \times A]\)

5.7 Continuation

\([[A, R], R]\)

6 Monoidal monad

A monoidal monad is a monad in the 2-category of monoidal categories, lax monoidal functors, and monoidal natural transformations.

7 Monoidal Kleisli category

For a monoidal monad \((T, \mu_T, \eta_T, \mu, \eta)\) in \((\cC, \otimes, I)\), the Kleisli category \(\cC_T\) inherits the monoidal structure from \(\cC\), whose

monoidal product \(\otimes_\Kl\) on objects is the monoidal product \(\otimes\) on \(\cC\)
monoidal product \(\otimes_\Kl\) on morphisms is obtained by \(f_\Kl \otimes_\Kl g_\Kl := \mu (f_\Kl \otimes g_\Kl)\)

\[(A \xto{f_\Kl} TB) \otimes_\Kl (C \xto{g_\Kl} TD) = A \otimes C \xto{f_\Kl \otimes_\Kl g_\Kl} T(B\otimes D) = A \otimes C \xto{f_\Kl \otimes g_\Kl} TB \otimes TD \xto{\mu_{B, D}} T(B \otimes D)\]
monoidal unit, associator, and left/right unitors are those of \(\cC\)