I am trying to define a function Sum f k that sums f from 0 up to k-1 such that

Sum f k = f 0 + ⋯ + f (k - 1).

I have defined it as follows:

fun Sum :: "(nat => nat) => nat => nat" where
  "Sum f 1 = f 0"
| "Sum f k = f (k-1) + Sum f (k-1)"

However, this gives the following error message:

Malformed definition:
Non-constructor pattern not allowed in sequential mode.
⋀f. Sum f 1 = f 0

This error message disappears when I define Sum f 0 = f 0, but this is not the function I am trying to define. I can also use function and give a soundness proof myself, but I would be quite surprised if that was necessary

Could someone explain the error message and recommend a workaround/correction?

1 Answer 1


You can only use constructors in pattern matches. The constructors of nat are 0 and Suc. So if you write 1 as (Suc 0) it should work.

  • Thanks, I followed your advice, but it now has 'unfinished subgoals'. I expect that means I need to use function instead - although I would prefer not to have to.
    – IIM
    Aug 16, 2016 at 15:31
  • Okay, I tried fun Sum :: "(nat => nat) => nat => nat" where "Sum f 0 = 0" | "Sum f (Suc k) = f k + Sum f k" and that seemed to work! I guess it needs to be Suc everywhere (and now the 'base case' makes more sense).
    – IIM
    Aug 16, 2016 at 15:47
  • You got unfinished subgoals, because your original definition did not terminate: Sum f 0 = f (0-1) + Sum f (0-1) = f 0 + Sum f 0 = .... Adding the case for 0 fixed this. Aug 17, 2016 at 15:09

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