Morph 66b32105424cbf11fdd36f55

There are 15 of these:

λ6-3λ4+3λ2-1 = 0

cannonical image of graph

This is a cannonical image. It's vertex numbers represent only this one permutation of the 15 permutations of this graph.

Uncolored matrix representation of:
"Created by Iterating on Possible Rows"
0 1 2 3 4 5 0 1 2 3 4 5
Black cells balanced relationship
Grey cells unbalanced relationship
White cells represent no relationship

Superposition matrix of all graphs for this morph:

0 3 3 3 3 3 3 0 3 3 3 3 3 3 0 3 3 3 3 3 3 0 3 3 3 3 3 3 0 3 3 3 3 3 3 0

Anti Morph

All 15 graphs that have this Morphology

  1. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 0
  2. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 0
  3. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 0
  4. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 0
  5. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 0
  6. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 0
  7. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 0
  8. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 6
  9. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 6
  10. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 6
  11. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 6
  12. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 6
  13. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 6
  14. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 6
  15. Created by Iterating on Possible Rows pseudoSkewSymmetryScore = 6