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Graphs G = (V,E) V is the vertex set. Vertices are also called nodes and points. E is the edge set. Each edge connects two different vertices. Edges are.

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Presentation on theme: "Graphs G = (V,E) V is the vertex set. Vertices are also called nodes and points. E is the edge set. Each edge connects two different vertices. Edges are."— Presentation transcript:

1 Graphs G = (V,E) V is the vertex set. Vertices are also called nodes and points. E is the edge set. Each edge connects two different vertices. Edges are also called arcs and lines. Directed edge has an orientation (u,v). uv

2 Graphs Undirected edge has no orientation (u,v). uv Undirected graph => no oriented edge. Directed graph => every edge has an orientation.

3 Undirected Graph 2 3 8 10 1 4 5 9 11 6 7

4 Directed Graph (Digraph) 2 3 8 10 1 4 5 9 11 6 7

5 Applications—Communication Network Vertex = city, edge = communication link. 2 3 8 10 1 4 5 9 11 6 7

6 Driving Distance/Time Map Vertex = city, edge weight = driving distance/time. 2 3 8 10 1 4 5 9 11 6 7 4 8 6 6 7 5 2 4 4 5 3

7 Street Map Some streets are one way. 2 3 8 10 1 4 5 9 11 6 7

8 Complete Undirected Graph Has all possible edges. n = 1 n = 2 n = 3 n = 4

9 Number Of Edges—Undirected Graph Each edge is of the form (u,v), u != v. Number of such pairs in an n vertex graph is n(n-1). Since edge (u,v) is the same as edge (v,u), the number of edges in a complete undirected graph is n(n-1)/2. Number of edges in an undirected graph is <= n(n-1)/2.

10 Number Of Edges--Directed Graph Each edge is of the form (u,v), u != v. Number of such pairs in an n vertex graph is n(n-1). Since edge (u,v) is not the same as edge (v,u), the number of edges in a complete directed graph is n(n-1). Number of edges in a directed graph is <= n(n-1).

11 Vertex Degree Number of edges incident to vertex. degree(2) = 2, degree(5) = 3, degree(3) = 1 2 3 8 10 1 4 5 9 11 6 7

12 Sum Of Vertex Degrees Sum of degrees = 2e (e is number of edges) 8 10 9 11

13 In-Degree Of A Vertex in-degree is number of incoming edges indegree(2) = 1, indegree(8) = 0 2 3 8 10 1 4 5 9 11 6 7

14 Out-Degree Of A Vertex out-degree is number of outbound edges outdegree(2) = 1, outdegree(8) = 2 2 3 8 10 1 4 5 9 11 6 7

15 Sum Of In- And Out-Degrees each edge contributes 1 to the in-degree of some vertex and 1 to the out-degree of some other vertex sum of in-degrees = sum of out-degrees = e, where e is the number of edges in the digraph

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