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User:Jason Kimberley/regular graphs index
From OeisWiki
Classification Categories
Connectivity, regularity, girth, loops, parallel edges, vertices labelled, edges labelled.
Category | Values |
---|---|
Connectivity | (C)onnected, (D)isconnected, (E)ither |
Regularity | each, all, non-negative |
Girth | exactly , at least , ignore |
Loops allowed | boolean |
Parallel edges allowed | boolean |
Vertices labelled | boolean |
Edges labelled | boolean |
For 0 or 1 regular graphs, there are no cycles, so girth is undefined.
Sortable Table
This sortable table was built using the format described in the Media Wiki Documentation.
Sequence | c | r | g | l | p | v | e |
---|---|---|---|---|---|---|---|
A005177 | C | all | ig. | F | F | F | F |
A068934 | C | each | ig. | F | F | F | F |
C | 0 | ig. | F | F | F | F | |
C | 1 | ig. | F | F | F | F | |
C | 2 | ≥3 | F | F | F | F | |
A002851 | C | 3 | ≥3 | F | F | F | F |
A006820 | C | 4 | ≥3 | F | F | F | F |
A006821 | C | 5 | ≥3 | F | F | F | F |
A006822 | C | 6 | ≥3 | F | F | F | F |
A014377 | C | 7 | ≥3 | F | F | F | F |
A014378 | C | 8 | ≥3 | F | F | F | F |
A014381 | C | 9 | ≥3 | F | F | F | F |
A014382 | C | 10 | ≥3 | F | F | F | F |
A014384 | C | 11 | ≥3 | F | F | F | F |
A068932 | D | all | ig. | F | F | F | F |
A068933 | D | each | ig. | F | F | F | F |
D | 0 | ig. | F | F | F | F | |
D | 1 | ig. | F | F | F | F | |
A165652 | D | 2 | ≥3 | F | F | F | F |
A165653 | D | 3 | ≥3 | F | F | F | F |
A033483 | D | 4 | ≥3 | F | F | F | F |
A165655 | D | 5 | ≥3 | F | F | F | F |
A165656 | D | 6 | ≥3 | F | F | F | F |
A165877 | D | 7 | ≥3 | F | F | F | F |
A165878 | D | 8 | ≥3 | F | F | F | F |
D | 9 | ≥3 | F | F | F | F | |
D | 10 | ≥3 | F | F | F | F | |
A005176 | E | all | ig. | F | F | F | F |
A051031 | E | each | ig. | F | F | F | F |
A000012 | E | 0 | ig. | F | F | F | F |
A059841 | E | 1 | ig. | F | F | F | F |
A008483 | E | 2 | ≥3 | F | F | F | F |
A005638 | E | 3 | ≥3 | F | F | F | F |
A033301 | E | 4 | ≥3 | F | F | F | F |
A165626 | E | 5 | ≥3 | F | F | F | F |
A165627 | E | 6 | ≥3 | F | F | F | F |
A165628 | E | 7 | ≥3 | F | F | F | F |
E | 8 | ≥3 | F | F | F | F | |
C | 2 | ≥4 | F | F | F | F | |
A014371 | C | 3 | ≥4 | F | F | F | F |
A033886 | C | 4 | ≥4 | F | F | F | F |
A058275 | C | 5 | ≥4 | F | F | F | F |
A058276 | C | 6 | ≥4 | F | F | F | F |
C | 2 | ≥5 | F | F | F | F | |
A014372 | C | 3 | ≥5 | F | F | F | F |
A058343 | C | 4 | ≥5 | F | F | F | F |
C | 5 | ≥5 | F | F | F | F | |
A014374 | C | 3 | ≥6 | F | F | F | F |
A058348 | C | 4 | ≥6 | F | F | F | F |
A014375 | C | 3 | ≥7 | F | F | F | F |
A014376 | C | 3 | ≥8 | F | F | F | F |
A006923 | C | 3 | =3 | F | F | F | F |
A006924 | C | 3 | =4 | F | F | F | F |
A006925 | C | 3 | =5 | F | F | F | F |
A006926 | C | 3 | =6 | F | F | F | F |
A006927 | C | 3 | =7 | F | F | F | F |
A026797 | E | 2 | =4 | F | F | F | F |
A008484 | E | 2 | ≥4 | F | F | F | F |
A026798 | E | 2 | =5 | F | F | F | F |
A026799 | E | 2 | =6 | F | F | F | F |
A026800 | E | 2 | =7 | F | F | F | F |
A026801 | E | 2 | =8 | F | F | F | F |
A026802 | E | 2 | =9 | F | F | F | F |
A026803 | E | 2 | =10 | F | F | F | F |
A026807 | E | 2 | ≥g | T | T | F | F |
A026794 | E | 2 | =g | T | T | F | F |
A167625 | E | r | T | T | F | F | |
A000012 | E | 0 | T | T | F | F | |
A059841 | E | 1 | T | T | F | F | |
A000041 | E | 2 | T | T | F | F | |
A129427 | E | 3 | T | T | F | F | |
A129429 | E | 4 | T | T | F | F | |
A129431 | E | 5 | T | T | F | F | |
A129433 | E | 6 | T | T | F | F | |
A129435 | E | 7 | T | T | F | F | |
A129437 | E | 8 | T | T | F | F |