# User:Michiexile/MATH198/Lecture 1

### From HaskellWiki

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* The composition of arrows is associative. |
* The composition of arrows is associative. |
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* Each vertex ''v'' has a dedicated arrow <math>1_v</math> with source and target ''v'', called the identity arrow. |
* Each vertex ''v'' has a dedicated arrow <math>1_v</math> with source and target ''v'', called the identity arrow. |
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− | * Each identity arrow is a left- and right-identity for the composition operation. |
+ | * Each identity arrow is a left- and right-identity for the composition operation. |

+ | The composition of <math>f:u\to v</math> with <math>g:v\to w</math> is denoted by <math>gf:u\to v\to w</math>. A mnemonic here is that you write things so associativity looks right. Hence, ''(gf)(x) = g(f(x))''. This will make more sense once we get around to ''generalized elements'' later on. |
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===Examples=== |
===Examples=== |
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;Endomorphism:A morphism with the same object as source and target. |
;Endomorphism:A morphism with the same object as source and target. |
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− | ;Monomorphism:A morphism that is greiu-cancellable. Corresponds to injective functions. |
+ | ;Monomorphism:A morphism that is left-cancellable. Corresponds to injective functions. We say that ''f'' is a monomorphism if for any <math>g_1,g_2</math>, the equation <math>fg_1 = fg_2</math> implies <math>g_1=g_2</math>. In other words, with a concrete perspective, ''f'' doesn't introduce additional relations when applied. |

− | ;Epimorphism:A morphism that is feiru-cancellable. Corresponds to surjective functions. |
+ | ;Epimorphism:A morphism that is right-cancellable. Corresponds to surjective functions. We say that ''f'' is an epimorphism if for any <math>g_1,g_2</math>, the equation <math>g_1f = g_2f</math> implies <math>g_1=g_2</math>. |

+ | Note, by the way, that cancellability does not imply the existence of an inverse. Epi's and mono's that have inverses realizing their cancellability are called ''split''. |
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+ | ;Isomorphism;A morphism is an isomorphism if it has an inverse. |
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==Objects== |
==Objects== |

## Revision as of 13:36, 27 August 2009

## Contents |

## 1 Welcome, administrativia

## 2 Introduction

Why this course? What will we cover? What do we require?

## 3 Category

A *graph* is a collection *G*_{0} of *vertices* and a collection *G*_{1} of *arrows*. The structure of the graph is captured in the existence of two functions, that we shall call *source* and *target*, both going from *G*_{1} to *G*_{1}. In other words, each arrow has a source and a target.

We denote by *[v,w]* the collection of arrows with source *v* and target *w*.

A *category* is a graph with some special structure:

- Each
*[v,w]*is a set and equipped with a composition operation . In other words, any two arrows, such that the target of one is the source of the other, can be composed to give a new arrow with target and source from the ones left out.

We write if .

=>

- The composition of arrows is associative.
- Each vertex
*v*has a dedicated arrow 1_{v}with source and target*v*, called the identity arrow. - Each identity arrow is a left- and right-identity for the composition operation.

The composition of with is denoted by . A mnemonic here is that you write things so associativity looks right. Hence, *(gf)(x) = g(f(x))*. This will make more sense once we get around to *generalized elements* later on.

### 3.1 Examples

- The empty category with no vertices and no arrows.
- The category
*1*with a single vertex and only its identity arrow. - The category
*2*with two objects, their identity arrows and the arrow . - For vertices take vector spaces. For arrows, take linear maps. This is a category, the identity arrow is just the identity map
*f*(*x*) =*x*and composition is just function composition. - For vertices take finite sets. For arrows, take functions.
- For vertices take logical propositions. For arrows take proofs in propositional logic. The identity arrow is the empty proof:
*P*proves*P*without an actual proof. And if you can prove*P*using*Q*and then*R*using*P*, then this composes to a proof of*R*using*Q*. - For vertices, take data types. For arrows take (computable) functions. This forms a category, in which we can discuss an abstraction that mirrors most of Haskell. There are issues making Haskell not quite a category on its own, but we get close enough to draw helpful conclusions and analogies.
- Suppose
*P*is a set equipped with a partial ordering relation*<*. Then we can form a category out of this set with elements for vertices and with a single element in*[v,w]*if and only if*v<w*. Then the transitivity and reflexivity of partial orderings show that this forms a category.

Some language we want settled:

A category is *concrete* if it is like the vector spaces and the sets among the examples - the collection of all sets-with-specific-additional-structure equipped with all functions-respecting-that-structure. We require already that *[v,w]* is always a set.

A category is *small* if the collection of all vertices, too, is a set.

## 4 Morphisms

The arrows of a category are called *morphisms*. This is derived from *homomorphisms*.

Some arrows have special properties that make them extra helpful; and we'll name them:

- Endomorphism
- A morphism with the same object as source and target.
- Monomorphism
- A morphism that is left-cancellable. Corresponds to injective functions. We say that
*f*is a monomorphism if for any*g*_{1},*g*_{2}, the equation*f**g*_{1}=*f**g*_{2}implies*g*_{1}=*g*_{2}. In other words, with a concrete perspective,*f*doesn't introduce additional relations when applied. - Epimorphism
- A morphism that is right-cancellable. Corresponds to surjective functions. We say that
*f*is an epimorphism if for any*g*_{1},*g*_{2}, the equation*g*_{1}*f*=*g*_{2}*f*implies*g*_{1}=*g*_{2}.

Note, by the way, that cancellability does not imply the existence of an inverse. Epi's and mono's that have inverses realizing their cancellability are called *split*.

- Isomorphism;A morphism is an isomorphism if it has an inverse.

## 5 Objects

In a category, we use a different name for the vertices: *objects*. This comes from the roots in describing concrete categories - thus while objects may be actual mathematical objects, but they may just as well be completely different.

Some objects, if they exist, give us strong