# Find at least one element that exists in all three lists in OCaml

We have three lists which contain people's names.

All three lists have been sorted alphabetically.

Now we need to find at least one name which appear in all three lists.

The algorithm I am thinking is like this:

I get three heads out of three lists.

if the three heads are not equal to each other, then I keep the max one and get two new heads from the lists from which I just dropped the heads.

Continue above procedure until I find such an element as described in the beginning.

Is this algorithm correct?

The problem is that I am not sure how to use ocaml to write the function.

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Thomash's algorithm will do the job with two calls of `intersect` and creating intermediate lists so it isn't very efficient.

Your algorithm is essentially correct. An extra bit is that sometimes you have two heads are equal to max and you should drop only the remaining head.

Here is the revised algorithm written in OCaml:

``````let rec intersect xs ys zs =
match xs, ys, zs with
| [], _, _ | _, [], _ | _, _, [] -> None
| x::xs', y::ys', z::zs' ->
if x = y && y = z then Some x
else
let m = max x (max y z) in
if x = m && y = m then intersect xs ys zs'
else if x = m && z = m then intersect xs ys' zs
else if y = m && z = m then intersect xs' ys zs
else if x = m then intersect xs ys' zs'
else if y = m then intersect xs' ys zs'
else intersect xs' ys' zs
``````
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``````let rec intersect l1 l2 = match l1, l2 with