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| == In Process of Updating... Check back 11/22/06 == |
In Process of Updating... Check back 11/22/06
Introduction
The SAGE Graph Theory Project aims to implement Graph objects and algorithms in ["SAGE"].
The goal of the Graph Database is to implement constructors for many common graphs, as well as thorough docstrings that can be used for educational purposes. Please check below for updates and note the section set aside for suggestions at the bottom of the page.
Emily Kirkman is working on this project.
Class Docstrings
A collection of constructors of common graphs.
USES:
A list of all graphs and graph structures in this database is available via tab completion.
Type "graphs." and then hit tab to see which graphs are available.
The docstrings include educational information about each named graph with the hopes that this
database can be used as a reference.
PLOTTING:
All graphs (i.e., networks) have an associated SAGE graphics object, which you can display:
sage: G = WheelGraph(15)
sage: p = G.plot()
sage: is_Graphics(p)
True
When creating a graph in SAGE, the default positioning of nodes is determined using the spring-layout
algorithm. Often, it is more efficient to pre-set the positions in a dictionary. Additionally, we can use
this position dictionary to display the graph in an intuitive manner, whereas the spring-layout would
fail if the graph is not very symmetric. For example, consider the Petersen graph with default node
positioning vs. the Petersen graph constructed by this database:
sage: petersen_spring = Graph({0:[1,4,5], 1:[0,2,6], 2:[1,3,7], 3:[2,4,8], 4:[0,3,9],\
5:[0,7,8], 6:[1,8,9], 7:[2,5,9], 8:[3,5,6], 9:[4,6,7]})
sage.: petersen_spring.show()
sage: petersen_database = graphs.PetersenGraph()
sage.: petersen_database.show()
For all the constructors in this database (except the random and empty graphs), the position dictionary
is filled, instead of using the spring-layout algorithm.
ORGANIZATION:
The constructors available in this database are organized as follows:
Basic Structures:
- EmptyGraph
- CycleGraph
- StarGraph
- WheelGraph
Named Graphs:
- PetersenGraph
Families of Graphs:
- CompleteGraph
- CompleteBipartiteGraph
- RandomGNP
- RandomGNPFast
AUTHORS:
-- Robert Miller (2006-11-05): initial version - empty, random, petersen
-- Emily Kirkman (2006-11-12): basic structures, node positioning for all constructors
-- Emily Kirkman (2006-11-19): docstrings, examples
TODO:
[] more named graphs
[] thorough docstrings and examples
Basic Structures
We've begun to implement some basic graph constructors with (hopefully) intuitive graphics. Please browse below and for more information on graph plotting, look at Rober Miller's [http://sage.math.washington.edu:9001/graph_plotting wiki].
Empty Graphs
Info
- Returns an empty graph (0 nodes and 0 edges).
- This is useful for constructing graphs by adding edges and vertices individually or in a loop.
Plotting
- When plotting, this graph will use the default spring-layout algorithm, unless a position dictionary is specified.
Examples
# Add one vertex to an empty graph and then show: sage: empty1 = graphs.EmptyGraph() sage: empty1.add_vertex() sage.: empty1.show()
# Use for loops to build a graph from an empty graph:
sage: empty2 = graphs.EmptyGraph()
sage: for i in range(5):
... empty2.add_vertex() # add 5 nodes, labeled 0-4
...
sage: for i in range(3):
... empty2.add_edge(i,i+1) # add edges {[0:1],[1:2],[2:3]}
...
sage: for i in range(4)[1:]:
... empty2.add_edge(4,i) # add edges {[1:4],[2:4],[3:4]}
...
sage.: empty2.show()
Cycle Graphs
- The Cycle Graph constructor takes an integer argument, which is to be the number of vertices in the graph.
- The chosen convention is to display this graph in a cyclic manner with the first node at the top and counterclockwise direction.
Info
Plotting
Examples
- Here is a cycle graph with n=10
attachment:cycle_10.png
Below, we used the SAGE GraphicsArray to show 9 cycle graphs at once, starting at n=3 and through n=11
attachment:cycle_array.png
Star Graphs
- The Star Graph constructor takes an integer argument, which is to be the number of outer vertices of the star. (Including the center, we will have n+1 nodes).
- The chosen convention is to place the first node in the center and have all outer nodes connect to it, starting with the second directly above and moving counterclockwise about the center.
Info
Plotting
Examples
- Here is a star graph with n=32 (i.e. 33 vertices)
attachment:star_33.png
Below, we used the SAGE GraphicsArray to show 16 star graphs at once, starting at n=3 (4 nodes) and through n=18 (19 nodes).
attachment:star_array.png
Wheel Graphs
- The Wheel Graph constructor takes an integer argument, which is to be the total number of nodes in the wheel graph.
- A wheel graph has a center node (the first by convention), which is connected to all other nodes (similar to the star graph).
- Also, a wheel graph has its outer nodes connected similar to a cycle graph.
- The chosen convention is to label the center node first, then directly above it and counterclockwise.
Info
Plotting
Examples
- Here is a wheel graph with n=32
attachment:wheel_32.png
Below, we used the SAGE GraphicsArray to show 16 wheel graphs at once, starting at n=4 and through n=19
attachment:wheel_array.png
Named Graphs
Petersen
- The Petersen Graph is commonly known and often used as a counterexample.
- This is actually the graph that inspired the desire for conventional, intuitive graphics - compare below the spring layout versus a planned dictionary of [x,y] tuples.
- Our labeling convention here is to start on the outer pentagon from the top, moving counterclockwise. Then the nodes on the inner star, starting at the top and moving counterclockwise.
Info
Plotting
Examples
- Here is the Petersen Graph as constructed in the database
attachment:petersen_pos.png
- And compare with the Petersen Graph plotted using the spring layout algorithm
attachment:petersen_spring.png
Graph Families
Complete Graphs
- The Complete Graph constructor takes an integer argument, which is the number of vertices to be in the graph.
- The chosen convention is to display this graph in a cyclic manner with the first node at the top and counterclockwise direction (via a position dictionary of [x,y] tuples).
Info
Plotting
Examples
- Here is a complete graph with n=16
C = graphs.CompleteGraph(16) C.show()
attachment:complete_16.png
Below, we used the SAGE GraphicsArray to show 16 complete graphs at once, starting at n=3 and through n=18.
attachment:complete_array.png
Complete Bipartite Graphs
- I'm still working on the scaling but I have examples up of the current results
- The constructor takes two integer arguments, n1 and n2, and results in a Complete Bipartite Graph with n1+n2 nodes.
- n1 nodes appear as the top row and the numeric labels begin left to right. Similarly, the numeric labels on the bottom row appear left to right.
- In a complete bipartite graph, every node from the n1 partition is connected only to every node in the n2 partition, and vice versa.
Info
Plotting
Examples
- Here is a complete bipartite graph with n1=9 and n2=6
attachment:complete_bipartite_9_6.png
Below, we used the SAGE GraphicsArray to show 16 complete bipartite graphs at once, iterating from (2,2) to (5,5)
attachment:complete_bipartite_array.png
Graphs I Plan to Add
Suggestions
- ???