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* A ''complete graph'' is a graph with <math>d(d-1)/2</math> edges.
 
* A ''complete graph'' is a graph with <math>d(d-1)/2</math> edges.
  
* A ''subgraph'' G' of a graph G=(V,E,f) is a graph (V',E',f') such that  
+
* A ''subgraph'' <math>G'</math> of a graph <math>G=(V,E,f)</math> is a graph <math>(V',E',f')</math> such that <math>V'\subset V</math> <math>E'\subset E</math> <math>f'\subset f</math> restricted to <math>E'</math>
  
 
* A ''path'' in a graph between <math>V_i,V_k \subset V_k</math> is an alternating sequence of vertices and edges containing no repeated edges and no repeated vertices and for which <math>e_i</math> is incident to <math>V_i</math> and <math>V_{i+1}</math>, for each <math>i=1,2,\dots,k-1</math>. (<math>V_1 e_1 V_2 e_2 V_3 \dots V_{k-1} e_{k-1} V_k</math>)
 
* A ''path'' in a graph between <math>V_i,V_k \subset V_k</math> is an alternating sequence of vertices and edges containing no repeated edges and no repeated vertices and for which <math>e_i</math> is incident to <math>V_i</math> and <math>V_{i+1}</math>, for each <math>i=1,2,\dots,k-1</math>. (<math>V_1 e_1 V_2 e_2 V_3 \dots V_{k-1} e_{k-1} V_k</math>)

Revision as of 09:48, 8 April 2008

Graph Theory Clustering

dataset $ \{x_1, x_2, \dots , x_d\} $ no feature vector given.

given $ dist(x_i , x_j) $

Construct a graph:

  • node represents the objects.
  • edges are relations between objects.
  • edge weights represents distances.


Definitions:

  • A complete graph is a graph with $ d(d-1)/2 $ edges.
  • A subgraph $ G' $ of a graph $ G=(V,E,f) $ is a graph $ (V',E',f') $ such that $ V'\subset V $ $ E'\subset E $ $ f'\subset f $ restricted to $ E' $
  • A path in a graph between $ V_i,V_k \subset V_k $ is an alternating sequence of vertices and edges containing no repeated edges and no repeated vertices and for which $ e_i $ is incident to $ V_i $ and $ V_{i+1} $, for each $ i=1,2,\dots,k-1 $. ($ V_1 e_1 V_2 e_2 V_3 \dots V_{k-1} e_{k-1} V_k $)
  • A graph is "connected" if a path exists between any two vertices in the graph
  • A component is a maximal connected graph. (i.e. includes as many nodes as possible)
  • A maximal complete subgraph of a graph G is a complete subgraph of G that is not a proper subgraph of any other complete subgraph of G.
  • A cycle is a path of non-trivial length k that comes back to the node where it started
  • A tree is a connected graph with no cycles. The weight of a tree is the sum of all edge weights in the tree.
  • A spanning tree is a tree containing all vertices of a graph.
  • A minimum spanning tree (MST) of a graph G is tree having minimal weight among all spanning trees of G.

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Christine Berkesch