AG-Monien/cage

cage graph sequence

Name	cage
Group	AG-Monien
Matrix ID	2436
Num Rows	366
Num Cols	366
Nonzeros	5,124
Pattern Entries	5,124
Kind	Undirected Graph Sequence
Symmetric	Yes
Date	1998
Author	R. Diekmann, R. Preis
Editor	R. Diekmann, R. Preis

Force-Directed Graph Visualization of AG-Monien/cage

Structural Rank
Structural Rank Full
Num Dmperm Blocks
Strongly Connect Components	1
Num Explicit Zeros	0
Pattern Symmetry	100%
Numeric Symmetry	100%
Cholesky Candidate	no
Positive Definite	no
Type	binary

SVD Statistics
Matrix Norm	1.400000e+01
Minimum Singular Value	3.605551e+00
Condition Number	3.882901e+00
Rank	366
sprank(A)-rank(A)
Null Space Dimension	0
Full Numerical Rank?	yes
Download Singular Values	MATLAB

Download	MATLAB Rutherford Boeing Matrix Market
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 cage sequence: 1 : cage_3_5 : 10 nodes 15 edges 30 nonzeros 2 : cage_3_6 : 14 nodes 21 edges 42 nonzeros 3 : cage_3_7 : 24 nodes 36 edges 72 nonzeros 4 : cage_3_8 : 30 nodes 45 edges 90 nonzeros 5 : cage_3_9.1 : 58 nodes 87 edges 174 nonzeros 6 : cage_3_9.2 : 58 nodes 87 edges 174 nonzeros 7 : cage_3_9.3 : 58 nodes 87 edges 174 nonzeros 8 : cage_3_9.4 : 58 nodes 87 edges 174 nonzeros 9 : cage_3_9.5 : 58 nodes 87 edges 174 nonzeros 10 : cage_3_9.6 : 58 nodes 87 edges 174 nonzeros 11 : cage_3_9.7 : 58 nodes 87 edges 174 nonzeros 12 : cage_3_9.8 : 58 nodes 87 edges 174 nonzeros 13 : cage_3_9.9 : 58 nodes 87 edges 174 nonzeros 14 : cage_3_9.10 : 58 nodes 87 edges 174 nonzeros 15 : cage_3_9.11 : 58 nodes 87 edges 174 nonzeros 16 : cage_3_9.12 : 58 nodes 87 edges 174 nonzeros 17 : cage_3_9.13 : 58 nodes 87 edges 174 nonzeros 18 : cage_3_9.14 : 58 nodes 87 edges 174 nonzeros 19 : cage_3_9.15 : 58 nodes 87 edges 174 nonzeros 20 : cage_3_9.16 : 58 nodes 87 edges 174 nonzeros 21 : cage_3_9.17 : 58 nodes 87 edges 174 nonzeros 22 : cage_3_9.18 : 58 nodes 87 edges 174 nonzeros 23 : cage_3_10.1 : 70 nodes 105 edges 210 nonzeros 24 : cage_3_10.2 : 70 nodes 105 edges 210 nonzeros 25 : cage_3_10.3 : 70 nodes 105 edges 210 nonzeros 26 : cage_3_11 : 112 nodes 168 edges 336 nonzeros 27 : cage_3_12 : 126 nodes 189 edges 378 nonzeros 28 : cage_3_13 : 272 nodes 408 edges 816 nonzeros 29 : cage_3_14 : 406 nodes 609 edges 1218 nonzeros 30 : cage_3_15 : 620 nodes 930 edges 1860 nonzeros 31 : cage_4_5 : 19 nodes 38 edges 76 nonzeros 32 : cage_4_6 : 26 nodes 52 edges 104 nonzeros 33 : cage_4_7 : 76 nodes 152 edges 304 nonzeros 34 : cage_4_8 : 80 nodes 160 edges 320 nonzeros 35 : cage_5_5 : 30 nodes 75 edges 150 nonzeros 36 : cage_5_6 : 42 nodes 105 edges 210 nonzeros 37 : cage_6_6 : 62 nodes 186 edges 372 nonzeros 38 : cage_7_5 : 50 nodes 175 edges 350 nonzeros 39 : cage_8_5 : 94 nodes 376 edges 752 nonzeros 40 : cage_8_6 : 114 nodes 456 edges 912 nonzeros 41 : cage_9_5 : 118 nodes 531 edges 1062 nonzeros 42 : cage_9_6 : 146 nodes 657 edges 1314 nonzeros 43 : cage_10_6 : 182 nodes 910 edges 1820 nonzeros 44 : cage_12_6 : 266 nodes 1596 edges 3192 nonzeros 45 : cage_14_6 : 366 nodes 2562 edges 5124 nonzeros The primary graph (Problem.A) in this sequence is the last graph in the sequence.

Download

MATLAB Rutherford Boeing Matrix Market

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 cage sequence:                                                   
                                                                               
     1 : cage_3_5     :      10 nodes      15 edges      30 nonzeros           
     2 : cage_3_6     :      14 nodes      21 edges      42 nonzeros           
     3 : cage_3_7     :      24 nodes      36 edges      72 nonzeros           
     4 : cage_3_8     :      30 nodes      45 edges      90 nonzeros           
     5 : cage_3_9.1   :      58 nodes      87 edges     174 nonzeros           
     6 : cage_3_9.2   :      58 nodes      87 edges     174 nonzeros           
     7 : cage_3_9.3   :      58 nodes      87 edges     174 nonzeros           
     8 : cage_3_9.4   :      58 nodes      87 edges     174 nonzeros           
     9 : cage_3_9.5   :      58 nodes      87 edges     174 nonzeros           
    10 : cage_3_9.6   :      58 nodes      87 edges     174 nonzeros           
    11 : cage_3_9.7   :      58 nodes      87 edges     174 nonzeros           
    12 : cage_3_9.8   :      58 nodes      87 edges     174 nonzeros           
    13 : cage_3_9.9   :      58 nodes      87 edges     174 nonzeros           
    14 : cage_3_9.10  :      58 nodes      87 edges     174 nonzeros           
    15 : cage_3_9.11  :      58 nodes      87 edges     174 nonzeros           
    16 : cage_3_9.12  :      58 nodes      87 edges     174 nonzeros           
    17 : cage_3_9.13  :      58 nodes      87 edges     174 nonzeros           
    18 : cage_3_9.14  :      58 nodes      87 edges     174 nonzeros           
    19 : cage_3_9.15  :      58 nodes      87 edges     174 nonzeros           
    20 : cage_3_9.16  :      58 nodes      87 edges     174 nonzeros           
    21 : cage_3_9.17  :      58 nodes      87 edges     174 nonzeros           
    22 : cage_3_9.18  :      58 nodes      87 edges     174 nonzeros           
    23 : cage_3_10.1  :      70 nodes     105 edges     210 nonzeros           
    24 : cage_3_10.2  :      70 nodes     105 edges     210 nonzeros           
    25 : cage_3_10.3  :      70 nodes     105 edges     210 nonzeros           
    26 : cage_3_11    :     112 nodes     168 edges     336 nonzeros           
    27 : cage_3_12    :     126 nodes     189 edges     378 nonzeros           
    28 : cage_3_13    :     272 nodes     408 edges     816 nonzeros           
    29 : cage_3_14    :     406 nodes     609 edges    1218 nonzeros           
    30 : cage_3_15    :     620 nodes     930 edges    1860 nonzeros           
    31 : cage_4_5     :      19 nodes      38 edges      76 nonzeros           
    32 : cage_4_6     :      26 nodes      52 edges     104 nonzeros           
    33 : cage_4_7     :      76 nodes     152 edges     304 nonzeros           
    34 : cage_4_8     :      80 nodes     160 edges     320 nonzeros           
    35 : cage_5_5     :      30 nodes      75 edges     150 nonzeros           
    36 : cage_5_6     :      42 nodes     105 edges     210 nonzeros           
    37 : cage_6_6     :      62 nodes     186 edges     372 nonzeros           
    38 : cage_7_5     :      50 nodes     175 edges     350 nonzeros           
    39 : cage_8_5     :      94 nodes     376 edges     752 nonzeros           
    40 : cage_8_6     :     114 nodes     456 edges     912 nonzeros           
    41 : cage_9_5     :     118 nodes     531 edges    1062 nonzeros           
    42 : cage_9_6     :     146 nodes     657 edges    1314 nonzeros           
    43 : cage_10_6    :     182 nodes     910 edges    1820 nonzeros           
    44 : cage_12_6    :     266 nodes    1596 edges    3192 nonzeros           
    45 : cage_14_6    :     366 nodes    2562 edges    5124 nonzeros           
                                                                               
The primary graph (Problem.A) in this sequence is the last graph               
in the sequence.