# How to generate an ordered list of parent-child elements from multiple lists?

I have this problem: Given a number of arrays (for example in Perl, or any other language):

``````1. (A,B,C)
2. (B,D,E,F)
3. (C,H,G)
4. (G,H)
``````

In each array, the first element is the parent, the rest are its children. In this case, element A has two children B and C, and B has three children D, E, and F, etc. I would like to process this set of arrays, and generate a list which contains the correct order. In this case, A is the root element, so comes B and C, then under B is D, E and F, and under C is G and H, and G also has H as children (which means an element can have multiple parent). This should be the resulting array.

Important: Look at array number 3, H comes before G, even though it's a child of G in the fourth array. So there is not particular order of children in each array, but in the final result (as shown below), must have any parent before it's child/ren.

(A,B,C,D,E,F,G,H) or (A,C,B,D,E,F,G,H) or (A,B,C,G,H,D,E,F)

Would be nice to have some recursive way of creating that array, but not a requirement. Thanks for your time..

-

This would be a simple post-order traversal if it wasn't for the possibility that a node has multiple parents.

To get around this, the easiest method is to assign a tier level to each node. In this case `H` appears on both tiers 3 and 4, and it is always the highest tier number that is required.

This code implements that design.

``````use strict;
use warnings;

my @rules = (
[qw/ A B C / ],
[qw/ B D E F / ],
[qw/ C H G / ],
[qw/ G H / ],
);

# Build the tree from the set of rules
#
my %tree;

for (@rules) {
my (\$parent, @kids) = @\$_;
\$tree{\$parent}{\$_}++ for @kids;
}

# Find the root node. There must be exactly one node that
# doesn't appear as a child
#
my \$root = do {
my @kids = map keys %\$_, values %tree;
my %kids = map {\$_ => 1} @kids;
my @roots = grep {not exists \$kids{\$_}} keys %tree;
die qq(Multiple root nodes "@roots" found) if @roots > 1;
die qq(No root nodes found) if @roots < 1;
\$roots[0];
};

# Build a hash of nodes versus their tier level using a post-order
# traversal of the tree
#
my %tiers;
my \$tier = 0;
traverse(\$root);

# Build the sorted list and show the result
#
my @sorted = sort { \$tiers{\$a} <=> \$tiers{\$b} } keys %tiers;
print "@sorted\n";

sub max {
no warnings 'uninitialized';
my (\$x, \$y) = @_;
\$x > \$y ? \$x : \$y;
}

sub traverse {
my (\$parent) = @_;
\$tier++;
my @kids = keys %{ \$tree{\$parent} };
if (@kids) {
traverse(\$_) for @kids;
}
\$tiers{\$parent} = max(\$tiers{\$parent}, \$tier);
\$tier--;
}
``````

output

``````A B C F E D G H
``````

Edit

This works slightly more cleanly as a hash of arrays. Here is that refactor.

``````use strict;
use warnings;

my @rules = (
[qw/ A B C / ],
[qw/ B D E F / ],
[qw/ C H G / ],
[qw/ G H / ],
);

# Build the tree from the set of rules
#
my %tree;

for (@rules) {
my (\$parent, @kids) = @\$_;
\$tree{\$parent} = \@kids;
}

# Find the root node. There must be exactly one node that
# doesn't appear as a child
#
my \$root = do {
my @kids = map @\$_, values %tree;
my %kids = map {\$_ => 1} @kids;
my @roots = grep {not exists \$kids{\$_}} keys %tree;
die qq(Multiple root nodes "@roots") if @roots > 1;
die qq(No root nodes) if @roots < 1;
\$roots[0];
};

# Build a hash of nodes versus their tier level using a post-order
# traversal of the tree
#
my %tiers;
traverse(\$root);

# Build the sorted list and show the result
#
my @sorted = sort { \$tiers{\$a} <=> \$tiers{\$b} } keys %tiers;
print "@sorted\n";

sub max {
no warnings 'uninitialized';
my (\$x, \$y) = @_;
\$x  > \$y ? \$x : \$y;
}

sub traverse {

my (\$parent, \$tier) = @_;
\$tier //= 1;

my \$kids = \$tree{\$parent};
if (\$kids) {
traverse(\$_, \$tier + 1) for @\$kids;
}
\$tiers{\$parent} = max(\$tiers{\$parent}, \$tier);
}
``````

The output is equivalent to the previous solution, given that there are multiple correct orderings. Note that `A` will always be first and `H` last, and `A C B F G D E H` is a possiblity.

-
Thanks. I have run the code against some "test samples", and it's give correct results. Nice code without any loops... –  Moni Apr 25 '12 at 20:42
@Gagan: You can remove a large chunk of code if you have preknowledge of the root of the data. I have edited my answer to a tider solution using a hash of arrays as in ikegami's solution. –  Borodin Apr 25 '12 at 20:54
what do you mean by preknowledge in this context? I do know the origin of the data. –  Moni Apr 25 '12 at 21:30
I mean you can remove the eight-line block of code that searches for the root of the data if you already know it. –  Borodin Apr 25 '12 at 22:12
No, I do not know that :-| –  Moni Apr 29 '12 at 10:10

This version also works, but it gives you a permutation of all correct answers, so you get correct result each time, but it may not be as your previous result (unless you have a lot of spare time...:-)).

``````#!/usr/bin/perl -w

use strict;
use warnings;

use Graph::Directed qw( );

my @rules = (
[qw( A B C )],
[qw( B D E F )],
[qw( C H G )],
[qw( G H )],
);

print @rules;

my \$graph = Graph::Directed->new();

for (@rules) {
my \$parent = shift(@\$_);
for my \$child (@\$_) {