Single-source Shortest Path (Weighted)

Supported Graph Characteristics

Weighted edges

Directed edges

Undirected edges

Homogeneous vertex types

Heterogeneous vertex types

Finding shortest paths in a graph with weighted edges is algorithmically harder than in an unweighted graph because even after you find one path to a vertex T, you cannot be certain that it is a shortest path.

If edge weights are always positive, then you must keep trying until you have considered every in-edge to T. If edge weights can be negative, then it’s even harder. You must consider all possible paths.

A classic application for a weighted shortest path algorithm is finding the shortest travel route to get from an origin location to a destination location. In this case, the edge weights would be the distances between vertices. In general, any application where you are looking for the cheapest route is a possible fit.

Notes

If you have edges with positive weights, use shortest_path_pos_wt, which is based on the delta-stepping approach, to take advantage of TigerGraph’s parallel processing. The well-known Dijsktra’s algorithm is not well-suited for parallel computation.

If you have edges with both positive and negative weights, use shortest_path_any_wt, which implements the Bellman-Ford algorithm. If there is more than one path with the same total weight, the algorithm returns one of them.

Specifications

The shortest path algorithm can be optimized if we know all the weights are non-negative. If there can be negative weights, then sometimes a longer path will have a lower cumulative weight. Therefore, we have two versions of this algorithm

tg_shortest_ss_pos_wt (VERTEX source,  SET<STRING> v_type_set,  SET<STRING> e_type_set,
 STRING wt_attr, STRING wt_type, INT print_limit = -1, BOOL print_results = TRUE,
 STRING result_attribute = "", STRING file_path = "", BOOL display_edges = FALSE)
tg_shortest_ss_any_wt (VERTEX source,  SET<STRING> v_type_set,  SET<STRING> e_type_set,
 STRING wt_attr, STRING wt_type, INT print_limit = -1, BOOL print_results = TRUE,
 STRING result_attribute = "", STRING file_path = "", BOOL display_edges = FALSE)

Parameters

Parameter Description Default

VERTEX source

The source vertex to start from. Provide the vertex ID and type as a tuple: ("id","type")

(empty string)

SET<STRING> v_type_set

Names of vertex types to use

(empty string)

SET<STRING> e_type_set

Names of edge types to use

N/A

STRING wt_attr

Name of the edge weight attribute

(empty string)

STRING wt_type

The data type of the edge weight attribute. Can be INT, FLOAT, or DOUBLE.

(empty string)

INT print_limit

If >=0, max number of vertices to output to JSON

-1

BOOL print_results

Whether to print results in JSON format to standard output

True

STRING result_attribute

If not empty, store distance values in INT to this vertex attribute

(empty string)

STRING file_path

If not empty, write output to this file.

(empty string)

BOOL display_edges

If true, include the graph’s edges in the JSON output, so that the full graph can be displayed in the query view window on GraphStudio.

False

Output

Computes a shortest distance (given in INT format) and a shortest path (STRING) from a given source vertex to all other vertices in the graph.

Returns a result size of \$V\$, the number of vertices in the graph.

Time complexity

For a graph with positive weight edges, the time complexity is approximately \$O(V+E)\$, where \$V\$ is equal to the number of vertices and \$E\$ is equal to the number of edges.

For a graph with positive and negative weight edges, the time complexity is \$O(V*E)\$.

Example

The graph below has only positive edge weights. Using vertex A as the source vertex, the algorithm discovers that the shortest weighted path from A to B is A-D-B, with distance 8. The shortest weighted path from A to C is A-D-B-C with distance 9.

Generic graph with only positive weights
[
  {
    "ResultSet": [
      {
        "v_id": "B",
        "v_type": "Node",
        "attributes": {
          "ResultSet.@dis": 8,
          "ResultSet.@path": [
            "D",
            "B"
          ]
        }
      },
      {
        "v_id": "A",
        "v_type": "Node",
        "attributes": {
          "ResultSet.@dis": 0,
          "ResultSet.@path": []
        }
      },
      {
        "v_id": "C",
        "v_type": "Node",
        "attributes": {
          "ResultSet.@dis": 9,
          "ResultSet.@path": [
            "D",
            "B",
            "C"
          ]
        }
      },
      {
        "v_id": "E",
        "v_type": "Node",
        "attributes": {
          "ResultSet.@dis": 7,
          "ResultSet.@path": [
            "D",
            "E"
          ]
        }
      },
      {
        "v_id": "D",
        "v_type": "Node",
        "attributes": {
          "ResultSet.@dis": 5,
          "ResultSet.@path": [
            "D"
          ]
        }
      }
    ]
  }
]

The graph below has both positive and negative edge weights. Using vertex A as the source vertex, the algorithm discovers that the shortest weighted path from A to E is A-D-C-B-E, with a cumulative score of 7 - 3 - 2 - 4 = -2.

Example results on a graph with negative weights on edges