The Binary Tree Maximum Path problem can be solved in using DFS. Here is a possible solution using this approach in Python.

def maxPathSum(self, root):
    def maxSum(root):
        if not root:
            return 0
        l_sum = maxSum(root.left)
        r_sum = maxSum(root.right)
        l = max(0, l_sum)
        r = max(0, r_sum)
        res[0] = max(res[0], root.val + l + r)
        return root.val + max(l, r)
    res = [-float('inf')]
    return res[0]

I am trying to use the same approach in Erlang. Assuming a node would look like:

{Value, Left, Right}

I came up with:

max_sum(undefined) -> 0;
max_sum({Value, Left, Right}) ->
    LeftSum = max(0, max_sum(Left)),
    RightSum = max(0, max_sum(Right)),
    %% Where to store the max? Should I use the process dictionary?
    %% Should I send a message?
    Value + max(LeftSum, RightSum).

max_path_sum(Root) ->
  %% Bonus question: how to represent -infinity in Erlang?

There are no global variables in Erlang. How can I keep track of the maximum during DFS? The only things that come to my mind are to use the process dictionary or an ETS table or maybe have a different process that can keep the maximum, but maybe I am overthinking and there is a more simple and idiomatic way?


The most "erlangish" way would be to pass the global maximum as a second parameter, and return it along with the local maximum:

max_sum(undefined, GlobalMax) -> {0, GlobalMax};
max_sum({Value, Left, Right}, GlobalMax0) ->
    {LeftSum, GlobalMax1} = max(0, max_sum(Left, GlobalMax0)),
    {RightSum, GlobalMax2} = max(0, max_sum(Right, GlobalMax1)),
    NewGlobalMax =
        case GlobalMax2 of
            undefined ->
                Value + LeftSum + RightSum
            _ ->
                max(GlobalMax2, Value + LeftSum + RightSum)
    {Value + max(LeftSum, RightSum), NewGlobalMax}.

max_path_sum(Root) ->
    {_, GlobalMax} = max_sum(Root, undefined),

Erlang doesn't support infinity values in floats, so I used the atom undefined to represent a smallest value instead.

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