If you are allowed to precompute linear in `|V|`

amount of data on graph then there are a family of algorithms which have sublinear query times for shortest paths in a graph.

- Gavoille et al. Distance labeling in graphs.
- Cohen et al. Reachability and distance queries via 2-hop labels
- Abraham, Goldberg et al. Hierarchical Hub Labellings for Shortest Paths

Some of them are used in Bing Maps for extremely fast shortest routes calculations.

The basic idea is to precompute for each vertex forward labels `L_f(v)`

and backward labels `L_b(v)`

which poses a **cover property**. Each label is a pair of a vertex and the distance to it, e.g. `L_f(v) = { (u, dist(v, u)) }`

and `L_r(v) = { (u, dist(u, v)) }`

. And the **cover property** asserts that for any vertices s and t `L_f(s)`

'Union' `L_r(t)`

contains at least one vertex on the shortest path from s to t.

Is there an open source implementation of one of those algorithms (C++, C#, F#, D, Go, Java)?