# HaTeX User's Guide

(Difference between revisions)

## 1 Preface

### 1.1 Introduction

The HaTeX library aspires to be the tool that Haskellers could want to make their LaTeX things without exit of their language (we understand that is difficult to leave Haskell after the first date), trying to be the most comprehensive and well done as possible. Do you think, anyway, that something could be done better? Perhaps something is lacked? Go then to the HaTeX mailing list [3] and leave your complain without mercy! Or, in the case you are a GitHub user, say your word in the issue list [4] or, to be awesome, make yourself a patch and send a pull request. This is the great thing about open source projects!

### 1.2 What is HaTeX?

Before we explain how HaTeX works, it is convenient to say what actually HaTeX is.

HaTeX is a Haskell library that provides functions to create, manipulate and parse LaTeX code.

People often says that HaTeX is a LaTeX DSL. With it you can enjoy all the advantages you already have in Haskell while creating LaTeX documents. A common purpose is to automatize the creation of such documents, perhaps from a source data in Haskell. A more exotic one is to render chess tables. Possibilities are in a wide range. The idea is the following: if you can do it with LaTeX, you can do it with HaTeX, but adding all the Haskell features.

## 2 Basics

Through this section you will learn the basics of HaTeX. Essentially, how it works.

### 2.1 The Monoid class

If you are already familiar with the
Monoid
Monoid
class is something that you must get used to in Haskell. But don't worry, it is quite simple (in spite of the similarity in the name with the
class).

A monoid in Mathematics is an algebraic structure consisting of a set of objects with an operation between them, being this operation associative and with a neutral element. Phew! But what is the meaning of this? By associative we mean that, if you have three elements a, b and c, then a * (b * c) = (a * b) * c. A neutral element is the one that does not worth to operate with, because it does nothing! To say, e is a neutral element if e * a = a * e = a, given any object a. As an example, you may take the real numbers as objects and the ordinary multiplication as operation.

Now that you know the math basics behind the
Monoid
class, let's see its definition:
class Monoid m where
mempty :: m
mappend :: m -> m -> m
mconcat :: [m] -> m
See that
mappend
corresponds to the monoid operation and
mempty
to its neutral element.

The names of the methods may seem insuitable, but they correspond to an example of monoid:

the lists with the appending
(++)
operation. Who is the neutral element here? The empty list:
xs ++ [] = [] ++ xs = xs
This class plays a significant role in HaTeX. Keep reading.

### 2.2 LaTeX blocks

Suppose we have a well-formed1 piece of LaTeX code, call it a.

Now, let
LaTeX
be a Haskell type in which each element represents a well-formed piece of LaTeX code. Then, a can be seen as a Haskell expression
a
of type
LaTeX
. We can say that
a
is a
LaTeX
block. What happens if we append, by juxtaposition, two
LaTeX
blocks? As both are well-formed, so is the result. Thus, two blocks appended form another block. This way, we can define an operation over the
LaTeX
blocks. If we consider that

a totally empty code is a well-formed piece of LaTeX code, we can speak about the empty block.

And, as the reader may notice, these blocks with its appending form a monoid. Namely,
LaTeX
can be done an instance of the
Monoid
class. Of course, our mission using HaTeX is to create a
LaTeX
block that fits our purpose. The way to achieve this is to create a multitude of
LaTeX
blocks and, then, use the
Monoid
operation

to collapse them all in a single block.

### 2.3 Creating blocks

We have now a universe of blocks forming a monoid. What we need now is a way to create these blocks.

As we said, a block is the representation of a well-formed piece of LaTeX code. Let
a
be the block of the LaTeX expression
\delta{}
2. Since this is a constant expression, it has a constant value in Haskell, named
delta
. Calling

this value will generate the desired block.

Other LaTeX expressions depend on a given argument. For example
, where
x
is

a number. How we deal with this? As you expect, with functions. We can create blocks that depend on values with functions that take these values as arguments, where these arguments can be

blocks as well. For instance, we have the function
with type:
linespread :: Float -> LaTeX
As you may know, a title in LaTeX can contain itself LaTeX code. So the type for the Haskell function
title
is:
title :: LaTeX -> LaTeX
And this is, essentialy, the way to work with HaTeX: to create blocks and combine them.

Once you have your final block ready, you will be able to create its corresponding LaTeX code (we will see how later). Note that for every block there is a LaTeX code, but not for every code there is a block, because a malformed (in the sense of the negation of our well-formed concept) code has not a block in correspondence. This fact has a practical consequence: we cannot create malformed LaTeX code. And that's a good deal!

#### 2.3.1 From strings

Inserting text in a LaTeX document is a constant task. You can create a block with text given

an arbitrary
String
with the
fromString
function, method of the
IsString
class:
class IsString a where
fromString :: String -> a
Since there is a set of characters reserved to create commands or another constructions,

HaTeX takes care and avoids them replacing each reserved character with a command which

output looks like the original character. For example, the backslash
\
is replaced with the
\backslash{}
command. The function that avoids reserved characteres is exported with the name
protectString
. Also, there is a variant for
Text
values called
protectText
. The use of the
IsString
class is because the Overloaded Strings extension.

This one is similar to the Overloaded Numbers Haskell feature, which translates the number

4
to
fromInteger 4
. In a similar way, with
enabled, the string
"foo"
is translated to
fromString "foo"
. If we now apply this to our blocks, the string
"foo"
will be automatically translated to a
latex
block with foo as content. Quite handy! We will assume the
extension enabled from now.

#### 2.3.2 More blocks

There is a lot of functions for create blocks. In fact, we can say that this is the main purpose of the library. LaTeX has a lot of commands, in order to set font attributes, create tables, insert graphics, include mathematical symbols, etc. So HaTeX have a function for each command defined in LaTeX (to tell the truth, only for a small subset). Please, go to the API documentation to read about particular functions. Build it locally or find it in Hackage: http://hackage.haskell.org/package/HaTeX.

You will find the class constraint
LaTeXC l
in every entity.
LaTeX
is an instance of this class, so you can assume that
l
is the
LaTeX
LaTeXC
class.

### 2.4 Putting blocks together

Once you have the blocks, as we said before, you need to append them. The
mappend
method of the
Monoid
class does this work. If
a
and
b
are two blocks,
mappend a b
, or
a mappend b
, or even
a <> b
3, is the block with
a
and
b
juxtaposed. For long lists of blocks, you can try it with
mconcat

as follows:

mconcat [ "I can see a "  , textbf "rainbow"
, " in the blue " , textit "sky" , "." ]
===Rendering===

This is the last step in our LaTeX document creation. When we have our final

LaTeX block
a
, the function
renderFile
can output it into a file, in

the form of its correspondent LaTeX code.

Say we have the next definition:

short =
documentclass [] article
<> title "A short message"
<> author "John Short"
<> document (maketitle <> "This is all.")
Then, after calling
renderFile "short.tex" short
, the following file appears

in the current working directory (line breaks added for easier visualization):

\documentclass{article}
\title{A short message}
\author{John Short}
\begin{document}
\maketitle{}
This is all
\end{document}
Finally, you may use commands like
latex
or
pdflatex
to compile the LaTeX

output to dvi or pdf.

The function
renderFile
is not only for
LaTeX
values. Let's see its type:
renderFile :: Render a => FilePath -> a -> IO ()
The
Render
class that appears in the context is defined:
class Render a where
render :: a -> Text
So, it is the class of types that can be rendered to a
Text
value. The type
LaTeX
is an instance, but other types, like
Int
or
Float
, so are too.

These instances are useful for creating blocks from other values. With the function

rendertex
, any value in the
Render
class can be transformed to a block. First, the value is converted to
Text
, and then to
LaTeX
the same way we did with strings. But, be careful! Because
rendertex
does not escape reserved characters.

### 2.5 Try yourself

As always, the best way to learn something well is to try it by yourself. Since to see code examples can give you a great help, HaTeX comes with several examples where you can see by yourself how to get the work done.

The API reference is also a good point to keep in mind. Descriptions of functions make you know how exactly they works. And, when they are not present, function names with type signatures may be very helpful and descriptive.

## 3 LaTeX blocks and the Writer monad

Fixed a monoid
M
, the
M
-writer monad is just all possible pairs of elements from
M

and elements from other types. Thus, the Haskell declaration is as follows4:

data W m a = W m a
Note that to get the monad we need to fix the type
m
* -> *
return
function) we use the neutral element (
mempty
)

of the monoid.

inject :: Monoid m => a -> W m a
inject a = W mempty a
Think that no other element of
m
is possible to think: it is the only element we know of it! Like any other monad,
W m
is also a
Functor
. We just apply the function to the value.
instance Functor (W m) where
fmap f (W m a) = W m (f a)
Every
instance can be given by the two monad operations
inject
and
join
inject
function. The other one deletes one monad type constructor.
join :: Monoid m => W m (W m a) -> W m a
join (W m (W m' a)) = W (mappend m m') a
In this function we use the other
Monoid
method to combine both values. It is important to note that in both monad operations
inject
and
join
we used
mempty
and
mappend

respectively. In practice, this is because they act equal. Indeed, they are equal if we forget the

a
value. Now, we are ready to define the
instance:
instance Monoid m => Monad (W m) where
return  = inject
w >>= f = join (fmap f w)

What we have done here is to hide in a monad a monoid with all its operations. We have created a

machine that operates monoid values. To insert a value into the machine we need the
tell

function:

tell :: m -> W m ()
tell m = W m ()
When we execute the machine, it returns to us the result of operate all the values we have put on it.
execute :: W m a -> m
execute (W m a) = m
Let's see the machine working. For example, the
Int
Monoid
.
instance Monoid Int where
mempty = 0
mappend = (+)

example :: Int
example = execute $do tell 1 tell 2 tell 3 tell 4 When we evaluate example we get 10 , as expected. Using mapM_ we can rewrite example . example :: Int example = execute$ mapM_ tell [ 1 .. 4 ]
===The LaTeX Monad=== Let's go back to the
LaTeX
type. Since
LaTeX
is an instance of
Monoid
we can construct its correspondent
Writer
type LaTeXW = W LaTeX
The
W
machine is waiting now for
LaTeX
values.
example :: LaTeX
example = execute $do tell$ documentclass [] article
tell $author "Monads lover" tell$ title "LaTeX and the Writer Monad"
We put all that blocks in the machine, and it returns the concatenated block. We saved a lot of
mappend
's, but we now have a lot of
tell
's. No problem. Just redefine each function of blocks with
tell
and
execute
.
author' :: LaTeXW a -> LaTeXW ()
author' = tell . author . execute
If it is done in a similar way with
documentclass
and
title
, every
tell
in
example

disappears.

example :: LaTeX
example = execute \$ do
documentclass' [] article
title' "LaTeX and the Writer Monad"
And we can now use the
LaTeX
machine more comfortably. However, we have all functions duplicated. This is why the
LaTeXC
class exists. We are going to talk about it later.

named
LaTeXT
. The way to use it is the same, there are just a few changes.

The first change is in type signatures. We need to carry an inner monad in every type.

foo :: Monad m => LaTeXT m a
However, in practice, we can avoid it. Say we going to use an specific monad
M
.
type LaTeXW = LaTeXT M

foo :: LaTeXW a
Now, type signatures remain unchanged. The other change is a new feature: the
lift
function. With it we can do any computation

of our inner monad at any time. For example, suppose we want to output some code we have in the file foo.hs. Instead of copy all its content, or read and carry it as an argument along the code,

you can simply read that file using
lift
wherever you want.
type LaTeXIO = LaTeXT IO

readCode :: FilePath -> LaTeXIO ()

example :: LaTeXIO ()
example = do
"This is the code I wrote this morning:"
"It was a funny exercise."
Different monads will give different features. In the case we are not interested in any of

these features, it is enough to use the Identity monad.

type LaTeXW = LaTeXT Identity

## 4 The LaTeXC class

HaTeX has two different interfaces. One uses blocks as
Monoid
elements and the other as
actions. If we want to keep both interfaces we have two choices: to duplicate

function definitions5 or to have a typeclass which unifies both interfaces. Since duplicate definitions is a hard work

and can arise problems6, we took the second alternative and defined the
LaTeXC
typeclass. Both
LaTeX
and
LaTeXT m a
are instances of
LaTeXC
(the second one is a little tricky), so every function in HaTeX is defined using the

typeclass. This way, we have both interfaces with a single import, without being worry about maintaining duplicated code. The cost is to have class constraints in type signatures. But these constraints are only required in the package. At the user level, you choose your interface and write type signatures in consequence.

## 5 Packages

LaTeX, in addition to its predefined commands, has a big number of packages that increase its power. HaTeX functions for some of these packages are defined in separated modules, one module per package. This way, you can import only those functions you actually need. Some of these modules are below explained.

### 5.1 Inputenc

This package is of vital importance if you use non-ASCII characters in your document. For example, if my name is Ángela, the Á character will not appear correctly in the

output. To solve this problem, use the
Inputenc
module.
import Text.LaTeX.Base
import Text.LaTeX.Packages.Inputenc

thePreamble :: LaTeX
thePreamble =
documentclass [] article
<> usepackage [utf8] inputenc
<> author "Ángela"
<> title "Issues with non-ASCII characters"

### 5.2 Graphicx

With the
Graphicx
package you can insert images in your document and do some other transformations. In order to insert an image use the
includegraphics

function.

includegraphics :: LaTeXC l => [IGOption] -> FilePath -> l
The list of
IGOption
's allows you to set some properties of the image, like width,

height, scaling or rotation. See the API documentation for details.

## 6 Epilogue

This guide is not static. It will certainly be changed with the time. Any reader can participate as a writer since the guide is itself open source (and written in Haskell!). The source repository can be reached at: https://github.com/Daniel-Diaz/hatex-guide. Read more detailed instructions in the README file.

If you think there is something unclear, something hard to understand, please, report it.

### 6.2 Notes from the author

I would like to end this guide saying thanks to all the people that has been interested in HaTeX somehow, especially to those who contributed to it with patches, opinions or bug reports. Thanks.

## 7 Footnotes

1: With well-formed we mean that all braces, environments, math expressions, ... are closed.

LaTeX
block is not the same that the LaTeX expression. The former

is a Haskell value, not the LaTeX code itself.

3: From GHC 7.4,
(<>)
is defined as a synonym for
mappend
. For previous

versions of GHC, HaTeX exports the synonym.

4: Some authors write it using tuples, like this:
data W m a = W (a,m)
. 5: This was the approach taken in HaTeX 3 until the version 3.3, where the
LaTeXC
class was included.

6: In fact, we had a problem with HaTeX-meta, the program that automatically generated the duplicated functions. The problem was described in a blog post: http://deltadiaz.blogspot.com.es/2012/04/hatex-trees-and-problems.html.