# Unsure of how to design a useful library using combinators

I've been reading about combinators and seen how useful they are (for example, in Haskell's Parsec). My problem is that I'm not quite sure how to use them practically.

Here's an outline of the problem: distributions can be generated, filtered, and modified. Distributions may be combined to create new distributions.

The basic interfaces are (in pseudo-Haskell type terminology):

``````generator::      parameters -> distribution

selector::       parameters -> (distribution -> distribution)

modifier::       parameters -> (distribution -> distribution)
``````

Now, I think that I see three combinators:

``````combine::     generator -> generator -> generator

filter::      generator -> selector -> generator

modify::      generator -> modifier -> generator
``````

Are these actually combinators? Do the combinators make sense/are there any other obvious combinators that I'm missing?

Thanks for any advice.

-
Try to reduce your question to it's essence, to get good answers. –  Pindatjuh Aug 16 '11 at 17:59
What is - apart from the name - the essential difference between `filter` and `modify`? –  FUZxxl Aug 16 '11 at 19:23
A 'selector' removes some points from a distribution; a modifier adjusts the location of some points in a distribution. So my intention with 'filter' is to combine a generator and a selector into a new generator, which will create a subset of the distribution of the original generator. And for 'modify' -- make a generator from a generator + modifier. –  Matt Fenwick Aug 16 '11 at 20:20

The `selector` and `modifier` functions are already perfectly good combinators! Along with `generator` and `combine` you can do stuff like (I'm going to assume statistical distributions for concreteness and just make things up!):

``````modifier (Scale 3.0) \$ generator StandardGaussian `combine` selector (LargerThan 10) . modifier (Shift 7) \$ generator (Binomial 30 0.2)
``````

You may have to mess around a bit with the priority of the combine operator for this to work smoothly :)

In general, when I'm trying to design a combinator library for values of type `A`, I like to keep my `A`'s "at the end", so that the partially applied combinators (your `selector` and `modifier`) can be chained together with `.` instead of having to `flip` through hoops.

Here's a nice blog article which can help you design combinators, it influenced a lot of my thinking: Semantic Editor Combinators.

EDIT: I may have misread your question, given the type signature of `combine`. Maybe I'm missing something, but wouldn't the distributions be the more natural objects your combinator should work on?

-
My intention was to use combinators to create new generators, selectors, and modifiers -- for instance, given a Halton subrandom generator and an exponentially decaying generator, I would like to combine them to create a Halton/exponential generator. –  Matt Fenwick Aug 16 '11 at 20:15