%-------------------------------------------------------------------------------
% UF Sparse Matrix Collection, Tim Davis
% http://www.cise.ufl.edu/research/sparse/matrices/AG-Monien/ccc
% name: AG-Monien/ccc
% [cube-connected cycle graph sequence]
% id: 2438
% date: 1998
% author: R. Diekmann, R. Preis
% ed: R. Diekmann, R. Preis
% fields: name title A id date author ed kind aux notes
% aux: coord G Gname Gcoord
% kind: undirected graph sequence
%-------------------------------------------------------------------------------
% notes:
% AG-Monien Graph Collection, Ralf Diekmann and Robert Preis                     
% http://www2.cs.uni-paderborn.de/fachbereich/AG/monien/RESEARCH/PART/graphs.html
%                                                                                
% A collection of test graphs from various sources.  Many of the graphs          
% include XY or XYZ coordinates.  This set also includes some graphs from        
% the Harwell-Boeing collection, the NASA matrices, and some random matrices     
% which are not included here in the AG-Monien/ group of the UF Collection.      
% In addition, two graphs already appear in other groups:                        
%                                                                                
%    AG-Monien/big : same as Nasa/barth5, Pothen/barth5 (not included here)      
%    AG-Monien/cage_3_11 : same as Pajek/GD98_c (included here)                  
%                                                                                
% The AG-Monien/GRID subset is not included.  It contains square grids that      
% are already well-represented in the UF Collection.                             
%                                                                                
% Six of the problem sets are included as sequences, each sequence being         
% a single problem instance in the UF Collection:                                
%                                                                                
%    bfly:  10 butterfly graphs 3..12                                            
%    cage:  45 cage graphs 3..12                                                 
%    cca:   10 cube-connected cycle graphs, no wrap                              
%    ccc:   10 cube-connected cycle graphs, with wrap                            
%    debr:  18 De Bruijn graphs                                                  
%    se:    13 shuffle-exchange graphs                                           
%                                                                                
% Problem.aux.G{:} are the graphs in these 6 sequences.  Problem.aux.Gname{:}    
% are the original names of each graph, and Problemm.aux.Gcoord{:} are the       
% xy or xyz coordinates of each node, if present.                                
%                                                                                
% Graphs in the ccc sequence:                                                    
%                                                                                
%      1 : CCC3         :      24 nodes      36 edges      72 nonzeros           
%      2 : CCC4         :      64 nodes      96 edges     192 nonzeros           
%      3 : CCC5         :     160 nodes     240 edges     480 nonzeros           
%      4 : CCC6         :     384 nodes     576 edges    1152 nonzeros           
%      5 : CCC7         :     896 nodes    1344 edges    2688 nonzeros           
%      6 : CCC8         :    2048 nodes    3072 edges    6144 nonzeros           
%      7 : CCC9         :    4608 nodes    6912 edges   13824 nonzeros           
%      8 : CCC10        :   10240 nodes   15360 edges   30720 nonzeros           
%      9 : CCC11        :   22528 nodes   33792 edges   67584 nonzeros           
%     10 : CCC12        :   49152 nodes   73728 edges  147456 nonzeros           
%                                                                                
% The primary graph (Problem.A) in this sequence is the last graph               
% in the sequence.                                                               
%-------------------------------------------------------------------------------
