I'm trying to get an expression and turn it into a standard form. To better clarify my purpose, assume you define a general style for your expressions like this:
∑(a*b) // sum of products
Now if you're given an input which is not in that format like: (a+b)*(c+d), you'll need to normalize it first.(Actually it is only a simple example and not my case) Now I have a code which is already written in ML and it's too long. Here you can see some snipets:
rew(p_choice(x,p_nil)) = rew(x) |
rew(p_choice(p_nil,x)) = rew(x) |
rew(p_sum(d,p_nil)) = p_nil |
rew(p_sum(d,p_choice(x,y))) = rew(p_choice(rew(p_sum(d,x)),rew(p_sum(d,y))))
rew(p_cond(b,p_nil,p_nil)) = p_nil |
rew(p_cond(b,p_choice(x,y),p_nil)) =rew(p_choice(rew(p_cond(b,x,p_nil)),rew(p_cond(b,y,p_nil)))) |
rew(p_cond(b,p_sum(x,y),p_nil)) = rew(p_sum(x,rew(p_cond(b,y,p_nil)))) |
rew(p_cond(b1,p_cond(b2,x,p_nil),p_nil)) = rew(p_cond(b1 andalso b2, x,p_nil)) |
rew(p_cond(b,x,p_nil)) = p_cond(b,x,p_nil) |
rew(p_cond(b,x,y)) =
rew(p_choice(rew(p_cond(b,x,p_nil)),rew(p_cond(not(b),y,p_nil))))
My question is, does Haskell introduce any features that can help this code be done more neatly?