I have a dependency graph that I have represented as a `Map<Node, Collection<Node>>`

(in Java-speak, or `f(Node n) -> Collection[Node]`

as a function; this is a mapping from a given node `n`

to a collection of nodes that depend on `n`

). The graph is potentially cyclic*.

Given a list `badlist`

of nodes, I would like to solve a *reachability problem*: i.e. generate a `Map<Node, Set<Node>> badmap`

that represents a mapping from each node N in the list `badlist`

to a set of nodes which includes N or other node that transitively depends on it.

Example:

```
(x -> y means node y depends on node x)
n1 -> n2
n2 -> n3
n3 -> n1
n3 -> n5
n4 -> n2
n4 -> n5
n6 -> n1
n7 -> n1
```

This can be represented as the adjacency map `{n1: [n2], n2: [n3], n3: [n1, n5], n4: [n2, n5], n6: [n1], n7: [n1]}`

.

If `badlist = [n4, n5, n1]`

then I expect to get `badmap = {n4: [n4, n2, n3, n1, n5], n5: [n5], n1: [n1, n2, n3, n5]}`

.

I'm floundering with finding graph algorithm references online, so if anyone could point me at an efficient algorithm description for reachability, I'd appreciate it. (An example of something that is *not* helpful to me is http://www.cs.fit.edu/~wds/classes/cse5081/reach/reach.html since that algorithm is to determine whether a specific node A is reachable from a specific node B.)

*cyclic: if you're curious, it's because it represents C/C++ types, and structures can have members which are pointers to the structure in question.