# Tree from adjacency map

I'm trying to make a function that builds a tree from an adjacency list of the form {node [children]}.

{nil [:a]
:a [:b :c]
:b [:d :e]
:c [:f]})

which should result in

{nil {:a {:b {:d nil
:e nil}
:c {:f nil}}}}

However I tried, I couldn't get it to work. Recursion is a bit of a weak spot of mine, and most recursion examples I found only dealt with recursion over a list, not a tree.

Edited: Original dataset and result were unintentionally nested too deep, due to not having an editor and original source at time of posting. Sorry about that.

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There is only one entry in every submap in adjacency. Is this necessary? And the same problem in the result tree.

I hope it would be more clear:

(def adjacency {:a [:b :c]
:b [:d :e]
:c [:f]})

So solution is:

(defn tree [m root]
(letfn [(tree* [l]
(if (contains? m l)
{l (into {} (map tree* (m l)))}
[l nil]))]
(tree* root)))

Test:

=> {:a {:b {:d nil
:e nil}
:c {:f nil}}}

Update. If you don't need the result tree as nested maps

(defn tree [m root]
(letfn [(tree* [l]
(if (contains? m l)
(list l (map tree* (m l)))
(list l nil)))]
(tree* root)))

=> (:a ((:b ((:d nil)
(:e nil)))
(:c ((:f nil)))))
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I usually prefer to use clojure.walk when dealing with trees. I am assuming that the root node is first in the adjacency vector.

(use 'clojure.walk)

[{nil [:a]}
{:a [:b :c]}
{:b [:d :e]}
{:c [:f]}])

(prewalk
(fn [x]
(if (vector? x)
(let [[k v] x lookup (into {} adjacency)]
[k (into {} (map (fn [kk] [kk (lookup kk)]) v))])
x))

Result: {nil {:a {:b {:d {}, :e {}}, :c {:f {}}}}}

NOTE: Empty child are represented as {} rather than nil, also child elements are maps rather than vector as map makes easy to navigate this tree then.

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