# Detecting cycles in a MySQL database using PHP

I have a table in MySQL with two (important) columns, A and B, with value referring to a package. A row is in the table if and only if package A requires on package B.

I was hoping to (1) generate a graph in php, then (2) determine if the graph is acyclic (a DAG), and if not, print (3) all the cycles in the graph.

So 3 is easy enough, in theory, (Johnson's algorithm: http://dutta.csc.ncsu.edu/csc791_spring07/wrap/circuits_johnson.pdf ).

(2) can be done by (3) listing no cycles, but I was wondering if there was any faster algorithms.

I'm unsure of (1) - efficiently pulling data from a table and making a graph in php that lends itself to implementing (2) and (3). How should I do so?

As an aside, I also have a second table, also with two columns, having a row if and only if A conflicts with B. I also wanted to (4) find cases (or verify that there are none) where: A requires B, B requires C, but A conflicts with C

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Do you have a maximum depth? –  Xepoch Feb 8 '11 at 12:46
Finite, but besides that, no. I may have a very long chain such as A=>B=>C=>...=>Z=>A. I should also clarify that its likely to be a directed forest as opposed to just a tree (i.e. unconnected). –  Zeophlite Feb 9 '11 at 1:14

In the interests of anyone who finds this topic in a search

(1)

``````\$pkgList = array();
\$result = mysqli_query(\$conn, 'SELECT * FROM `Packages`');
while ((\$row = mysqli_fetch_array(\$result, MYSQLI_ASSOC)) != NULL) {
\$pkgList[] = \$row['idPackages'];
}

\$reqEdgeList = array();
\$conEdgeList = array();

\$result = mysqli_query(\$conn, "SELECT * FROM `Dependancies` WHERE `Relationship` = 'Requires'");
while ((\$row = mysqli_fetch_array(\$result, MYSQLI_ASSOC)) != NULL) {
switch (\$row['Relationship']) {
case 'Requires':
\$reqEdgeList[] = array(\$row["DependerPackage"], \$row["DependeePackage"]);
break;
case 'Conflicts':
\$conEdgeList[] = array(\$row["DependerPackage"], \$row["DependeePackage"]);
break;
}
}
``````

(2) and (3)

I ended up using the algorithm here. Basically by removing leaf nodes, you are either left with a (set of) loop(s) or an empty graph.

``````\$allReqs = \$reqEdgeList;

\$noDependanciesCycle = true;

\$searching = true;
while (\$searching) {
if (empty(\$pkgList)) {
\$searching = false;
echo "Req is a DAG\n<br />";
} else {
\$foundleaf = false;
\$leaf = null;
foreach (\$pkgList as \$key => \$l) {
\$isLeaf = true;
foreach (\$reqEdgeList as \$k => \$edge) {
if (\$edge[0] == \$l) {
\$isLeaf = false;
}
}

if (\$isLeaf) {
\$foundleaf = true;
\$leaf = \$l;
}
}
if (\$foundleaf) {
\$pkgList = array_diff(\$pkgList, array(\$leaf));
foreach (\$reqEdgeList as \$key => \$value) {
if (\$value[1] == \$leaf) {
unset(\$reqEdgeList[\$key]);
}
}
\$reqEdgeList = array_values(\$reqEdgeList);
} else {
\$searching = false;
echo "Req cycle detected\n<br />";
\$noDependanciesCycle = false;
print_r(\$reqEdgeList);
echo "<br />\n";
}
}
}
``````

(4)

For finding A requires B requires C, but A conflicts with C, I used a depth first search for each conflict, starting from A, looking for C (the conflict).

``````\$reqEdgeList = \$allReqs;
echo "<br />\n";

\$anyReqConfError = false;
foreach (\$conEdgeList as \$endpoints) {
for (\$i = 0; \$i < 2; \$i++) {
if (\$i == 0) {
\$startPkg = \$endpoints[0];
\$endPkg = \$endpoints[1];
} else {
\$startPkg = \$endpoints[1];
\$endPkg = \$endpoints[0];
}

\$marked = array();
foreach (\$allPkgs as \$pkg) {
\$marked[\$pkg] = false;
}

\$queue = array();
\$queue[] = \$startPkg; // enque
\$marked[\$startPkg] = true;

\$searching = true;
\$found = false;
while (\$searching) {
\$v = array_shift(\$queue); // deque (use array_pop for stack (dfs))
if (\$v == \$endPkg) {
\$searching = false;
\$found = true;
} else {
foreach (\$reqEdgeList as \$edge) {
if (\$edge[0] == \$v) {
\$w = \$edge[1];
if (!\$marked[\$w]) {
\$marked[\$w] = true;
\$queue[] = \$w;
}
}
}
}

if(\$searching) {
\$searching = !empty(\$queue);
}
}

if(\$found) {
echo "\$startPkg requires \$endPkg, but are conflicting [\$endpoints[0] \$endpoints[1]]\n<br />";
\$anyReqConfError = true;
\$noDependanciesCycle = false;
}
}
}
``````

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