Graphs Data Structure Questions

It depends on the heuristic function and can be exponential in the worst case.

O(V + E), where V is the number of vertices and E is the number of edges

O(V^2), where V is the number of vertices

O(E log V), where V is the number of vertices and E is the number of edges

Queue

Stack

Linked list

Binary heap

At most two vertices have a difference of 1 between their in-degree and out-degree, and all other vertices have equal in-degree and out-degree.

The graph has no cycles.

The graph is strongly connected.

All vertices have the same in-degree and out-degree.

Cannot be determined

12 units

11 units

10 units

O(E^2 * V)

O(V + E)

O(V^2 * E)

O(V * E)

It detects and reports the existence of negative weight cycles, indicating that a shortest path may not exist.

It modifies the edge weights to eliminate negative cycles before finding the shortest path.

It ignores negative weight cycles and finds the shortest path regardless.

It utilizes a separate algorithm to handle negative weight cycles after executing the main algorithm.

The graph is connected.

The number of vertices is greater than or equal to 3.

Every vertex has a degree of at least 2.

The graph is planar.

Both Dijkstra's and Bellman-Ford algorithm

Only Bellman-Ford algorithm

Only Dijkstra's algorithm

Neither algorithm can find the shortest path

Directed acyclic graphs (DAGs)

Sparse graphs with negative edge weights

Unweighted graphs

Dense graphs with positive edge weights

A* search algorithm and Dijkstra's algorithm

Depth-First Search and Breadth-First Search

Dijkstra's algorithm and Bellman-Ford algorithm

Bellman-Ford algorithm and Floyd-Warshall algorithm