# Retrieving full hierachy sorted by a column under PostgreSQL's Ltree module

I'm using PostgreSQL's Ltree module for storing hierarchical data. I'm looking to retrieve the full hierarchy sorted by a particular column.

Consider the following table:

``````  votes | path  | ...
-------+-------+-----
1 | 1     | ...
2 | 1.1   | ...
4 | 1.2   | ...
1 | 1.2.1 | ...
3 | 2     | ...
1 | 2.1   | ...
2 | 2.1.1 | ...
4 | 2.1.2 | ...
... | ...   | ...
``````

In my current implementation, I'd query the database with `SELECT * FROM comments ORDER BY path`, which would return the whole tree:

``````Node 1
-- Node 1.1
-- Node 1.2
---- Node 1.2.1
Node 2
-- Node 2.1
---- Node 2.1.1
---- Node 2.1.2
``````

However, I want to sort by `votes` (not by `id`, which is what sorting by `path` amounts to). Each depth level needs to be independently sorted, with the correct tree structure kept intact. Something that would return the following:

``````Node 2
-- Node 2.1
---- Node 2.1.2
---- Node 2.1.1
Node 1
-- Node 1.2
---- Node 1.2.1
-- Node 1.1
``````

Postgres' `WITH RECURSIVE` might be appropriate, but I'm not sure. Any ideas?

-
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## 1 Answer

You were on the right track with `WITH RECURSIVE`.

### Solution with recursive CTE

``````WITH RECURSIVE t AS (
SELECT t.votes
,t.path
,1::int AS lvl
,to_char(t2.votes, 'FM0000000')  AS sort
FROM   tbl t
JOIN   tbl t2 ON t2.path = subltree(t.path, 0, 1)

UNION ALL
SELECT t.votes
,t.path
,t.lvl + 1
,t.sort || to_char(t2.votes, 'FM0000000')
FROM   t
JOIN   tbl t2 ON t2.path = subltree(t.path, 0, t.lvl + 1)
WHERE  nlevel(t.path) > t.lvl
)
SELECT votes, path, max(sort) AS sort
FROM   t
GROUP  BY 1,2
ORDER  BY max(sort), path;
``````

### Major points:

• The crucial part is to replace every level of the path with the value of `votes`. Thereby we assemble one column we can `ORDER BY` at the end. This is necessary, because the path has an unknown depth and we cannot order by an unknown number of expressions in static SQL.

• In order to get a stable sort, I convert `votes` to a string with leading zeroes using `to_char()`. I use seven digits in the demo, which works for vote values below 10.000.000. Adjust according to your maximum vote count.

• In the final `SELECT` I exclude all intermediary states to eliminate duplicates. Only the last step with `max(sort)` remains.

• This works in standard SQL with a recursive CTE, but is not very efficient for large trees. A plpgsql function that recursively updates the sort path in a temporary table without creating temporary dupes might perform better.

• Only works with the ltree module installed. The functions subltree(...) and nlevel(.) as well as the ltree date type are not part of standard PostgreSQL.

My test setup, for your review convenience:

``````DROP TABLE tbl;
CREATE TEMP TABLE tbl(votes int, path ltree);
INSERT INTO tbl VALUES
(1, '1')
,(2, '1.1')
,(4, '1.2')
,(1, '1.2.1')
,(3, '2')
,(1, '2.1')
,(2, '2.1.1')
,(4, '2.1.2')
,(1, '2.1.3')
,(2, '3')
,(17, '3.3')
,(99, '3.2')
,(10, '3.1.1')
,(2345, '3.1.2')
,(1, '3.1.3');
``````

### PL/pgSQL table function doing the same:

Should be faster with huge trees.

``````CREATE OR REPLACE FUNCTION x.fsorted_ltree()
RETURNS TABLE(votes int, path ltree) AS
\$BODY\$
DECLARE
lvl integer := 0;
BEGIN

CREATE TEMP TABLE t ON COMMIT DROP AS
SELECT tbl.votes
,tbl.path
,''::text AS sort
,nlevel(tbl.path) AS depth
FROM   tbl;

-- CREATE INDEX t_path_idx ON t (path);   -- beneficial for huge trees
-- CREATE INDEX t_path_idx ON t (depth);

LOOP
lvl := lvl + 1;

UPDATE t SET sort = t.sort || to_char(v.votes, 'FM0000000')
FROM  (
SELECT t2.votes, t2.path
FROM   t t2
WHERE  t2.depth = lvl
) v
WHERE  v.path = subltree(t.path, 0 ,lvl);

EXIT WHEN NOT FOUND;
END LOOP;

-- Return sorted rows
RETURN QUERY
SELECT t.votes, t.path
FROM   t
ORDER  BY t.sort;

END;
\$BODY\$
LANGUAGE plpgsql VOLATILE;
``````

Call:

``````SELECT * FROM f_sorted_ltree()
``````

Read in the manual about setting `temp_buffers`.

I would be interested which performs faster with your real life data.

-
Thanks for the amazing reply. This is a quite clever solution. I'm setting up a clone of the production database to test various approaches and I'll let you know. –  David Chouinard Jan 10 '12 at 14:39
Your second solution is about twice as fast as the first on my data. My trees aren't very deep (max 5-6 levels) and have <100 elements. I'm not seeing much of a differences in performance between both approaches on my larger trees (still ~2x faster). However, I'm attempting to sort `votes` in descending order, but ordering `sort` by `DESC` messes up the tree. Any thoughts there? –  David Chouinard Jan 14 '12 at 17:43
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