In algebra, as in everyday concept formation, abstractions are formed by grouping things by some essential characteristics and omitting their specific other characteristics. The abstraction is unified under a single symbol or word denoting the similarities. We say that we *abstract over* the differences, but this really means we're *integrating* by the similarities.

For example, consider a program that takes the sum of the numbers `1`

, `2`

, and `3`

:

```
val sumOfOneTwoThree = 1 + 2 + 3
```

This program is not very interesting, since it's not very abstract. We can *abstract over* the numbers we're summing, by integrating all lists of numbers under a single symbol `ns`

:

```
def sumOf(ns: List[Int]) = ns.foldLeft(0)(_ + _)
```

And we don't particularly care that it's a List either. List is a specific type constructor (takes a type and returns a type), but we can *abstract over* the type constructor by specifying which essential characteristic we want (that it can be folded):

```
trait Foldable[F[_]] {
def foldl[A, B](as: F[A], z: B, f: (B, A) => B): B
}
def sumOf[F[_]](ns: F[Int])(implicit ff: Foldable[F]) =
ff.foldl(ns, 0, (x: Int, y: Int) => x + y)
```

And we can have implicit `Foldable`

instances for `List`

and any other thing we can fold.

```
implicit val listFoldable = new Foldable[List] {
def foldl[A, B](as: List[A], z: B, f: (B, A) => B) = as.foldLeft(z)(f)
}
val sumOfOneTwoThree = sumOf(List(1,2,3))
```

What's more, we can *abstract over* both the operation and the type of the operands:

```
trait Monoid[M] {
def zero: M
def add(m1: M, m2: M): M
}
trait Foldable[F[_]] {
def foldl[A, B](as: F[A], z: B, f: (B, A) => B): B
def foldMap[A, B](as: F[A], f: A => B)(implicit m: Monoid[B]): B =
foldl(as, m.zero, (b: B, a: A) => m.add(b, f(a)))
}
def mapReduce[F[_], A, B](as: F[A], f: A => B)
(implicit ff: Foldable[F], m: Monoid[B]) =
ff.foldMap(as, f)
```

Now we have something quite general. The method `mapReduce`

will fold any `F[A]`

given that we can prove that `F`

is foldable and that `A`

is a monoid or can be mapped into one. For example:

```
case class Sum(value: Int)
case class Product(value: Int)
implicit val sumMonoid = new Monoid[Sum] {
def zero = Sum(0)
def add(a: Sum, b: Sum) = Sum(a.value + b.value)
}
implicit val productMonoid = new Monoid[Product] {
def zero = Product(1)
def add(a: Product, b: Product) = Product(a.value * b.value)
}
val sumOf123 = mapReduce(List(1,2,3), Sum)
val productOf456 = mapReduce(List(4,5,6), Product)
```

We have *abstracted over* monoids and foldables.