Difference between revisions of "The Degree Diameter Problem for Circulant Graphs"

Revision as of 13:20, 7 March 2019

Table of the orders of the largest known circulant graphs

[math]d[/math]\[math]k[/math]	2	3	4	5	6	7	8	9	10
3	8	12	16	20	24	28	32	36	40
4	13	25	41	61	85	113	145	181	221
5	16	36	64	100	144	196	256	324	400
6	21	55	117	203	333	515	737	1 027	1 393
7	26	76	160	308	536	828	1 232	1 764	2 392
8	35	104	248	528	984	1 712	2 768	4 280	6 320
9	42	130	320	700	1 416	2 548	4 304	6 804	10 320
10	51	177	457	1 099	2 380	4 551	8 288	14 099	22 805
11	56	210	576	1 428	3 200	6 652	12 416	21 572	35 880
12	67	275	819	2 120	5 044	10 777	21 384	39 996	69 965
13	80	312	970	2 676	6 256	14 740	30 760	57 396	106 120
14	90	381	1 229	3 695	9 800	23 304	49 757	103 380	196 689
15	96	448	1 420	4 292	12 232	32 092	68 944	142 516	276 928
16	112	518	1 788	5 847	17 733	44 328	107 748	321 780	659 464

The following table is the key to the colors in the table presented above:

Color	Details
*	Numbers in bold indicate graphs known to be optimal.
*	Optimal graphs.
*	Optimal graphs found by E. Monakhova.
*	Graphs found by H. Macbeth, J. Šiagiová, J. Širáň and T. Vetrík.
*	Graphs found by R. Dougherty and V. Faber and independently for d=6 by E. Monakhova.
*	Graphs found by B. McKay.
*	Graphs found by R. Lewis.
*	Graphs found by R. Lewis and independently by R. Feria-Puron, H. Pérez-Rosés and J. Ryan.
*	Graphs found by R. Feria-Puron, H. Pérez-Rosés and J. Ryan.
*	Graphs found by D. Bevan, G. Erskine and R. Lewis.
*	Graphs found by O. Monakhov and E. Monakhova.

Table of the lowest upper bounds known at present, and the percentage of the order of the largest known graphs

[math]d[/math]\[math]k[/math]

2

3

4

5

6

7

8

9

10

3

8

100%

12

100%

16

100%

20

100%

24

100%

28

100%

32

100%

36

100%

40

100%

4

13

100%

25

100%

41

100%

61

100%

85

100%

113

100%

145

100%

181

100%

221

100%

5

16

100%

36

100%

64

100%

100

100%

144

100%

196

100%

256

100%

324

100%

400

100%

6

21

100%

55

100%

117

100%

203

100%

333

100%

515

100%

737

100%

1 027

100%

1 393

100%

7

26

100%

76

100%

160

100%

308

100%

536

100%

828

100%

1 232

100%

1 764

100%

2 392

100%

8

35

100%

104

100%

248

100%

528

100%

984

100%

1 712

100%

3 649

76%

5 641

76%

8 361

76%

9

42

100%

130

100%

320

100%

700

100%

1 416

100%

3 530

72%

5 890

73%

9 290

73%

14 002

74%

10

51

100%

177

100%

681

67%

1 683

65%

3 653

65%

7 183

63%

13 073

63%

22 363

63%

36 365

63%

11

56

100%

210

100%

912

63%

2 364

60%

5 336

60%

10 836

61%

20 256

61%

35 436

61%

58 728

61%

12

67

100%

275

100%

1 289

64%

3 653

58%

8 989

56%

19 825

54%

40 081

53%

75 517

53%

134 245

52%

13

80

100%

312

100%

1 666

58%

4 942

54%

12 642

49%

28 814

51%

59 906

51%

115 598

50%

209 762

51%

14

90

100%

381

100%

2 241

55%

7 183

51%

19 825

49%

48 639

48%

108 545

46%

224 143

46%

433 905

45%

15

96

100%

448

100%

2 816

50%

9 424

46%

27 008

45%

68 464

47%

157 184

44%

332 688

43%

658 048

42%

16

112

100%

833

62%

3 649

49%

13 073

45%

40 081

44%

108545

41%

265 729

41%

598 417

39%

1 256 465

38%

References

D. Bevan, G. Erskine, and R. Lewis. Large circulant graphs of fixed diameter and arbitrary degree. ArXiv
R. Feria-Puron, J. Ryan, and H. Perez-Roses. Searching for Large Multi-Loop Networks. Electronic Notes in Discrete Mathematics, vol. 46 (2014), pp. 233-240. doi:10.1016/j.endm.2014.08.031. Link to journal
R.R. Lewis. The Degree/Diameter Problem for Circulant Graphs of Degree 8 and 9. The Electronic Journal of Combinatorics, vol. 21(4) (2014), #P4.50. Link to journal
E.A. Monakhova, Synthesis of optimal Diophantine structures, Comput. Syst. Novosibirsk , 80 (1979), p.18--35. (in Russian).
E. Monakhova, Optimal Triple Loop Networks with Given Transmission Delay: Topological Design and Routing, Inter. Network Optimization Conference, (INOC'2003), Evry/Paris, France, (2003), p.410--415.
E.A. Monakhova . On synthesis of multidimensional circulant graphs of diameter two, Bulletin of the Tomsk Polytechnic University. 323(2) (2013), p.25--28. (in Russian). Link to journal

@@ Line 626: / Line 626: @@
 |3 653
 |-
-|56%
+|58%
 |}
 | align="center" |
 {| border="2" style="background:#ABCDEF;"
-|3 910
+|8 989
 |-
-|48%
+|56%
 |}
 | align="center" |
@@ Line 638: / Line 638: @@
 |19 825
 |-
-|45%
+|54%
 |}
 | align="center" |
@@ Line 644: / Line 644: @@
 |40 081
 |-
-|41%
+|53%
 |}
 | align="center" |
@@ Line 650: / Line 650: @@
 |75 517
 |-
-|39%
+|53%
 |}
 | align="center" |
@@ Line 656: / Line 656: @@
 |134 245
 |-
-|38%
+|52%
 |}
 |-
@@ Line 685: / Line 685: @@
 |4 942
 |-
-|52%
+|54%
 |}
 | align="center" |
@@ Line 691: / Line 691: @@
 |12 642
 |-
-|44%
+|49%
 |}
 | align="center" |
@@ Line 697: / Line 697: @@
 |28 814
 |-
-|42%
+|51%
 |}
 | align="center" |
@@ Line 703: / Line 703: @@
 |59 906
 |-
-|37%
+|51%
 |}
 | align="center" |
@@ Line 709: / Line 709: @@
 |115 598
 |-
-|35%
+|50%
 |}
 | align="center" |
@@ Line 715: / Line 715: @@
 |209 762
 |-
-|35%
+|51%
 |}
 |-
@@ Line 744: / Line 744: @@
 | 7 183
 |-
-|45%
+|51%
 |}
 | align="center" |
@@ Line 750: / Line 750: @@
 | 19 825
 |-
-|39%
+|49%
 |}
 | align="center" |
@@ Line 756: / Line 756: @@
 | 48 639
 |-
-|36%
+|48%
 |}
 | align="center" |
@@ Line 762: / Line 762: @@
 | 108 545
 |-
-|33%
+|46%
 |}
 | align="center" |
@@ Line 768: / Line 768: @@
 | 224 143
 |-
-|32%
+|46%
 |}
 | align="center" |
@@ Line 774: / Line 774: @@
 | 433 905
 |-
-|29%
+|45%
 |}
 |-
@@ Line 803: / Line 803: @@
 | 9 424
 |-
-|42%
+|46%
 |}
 | align="center" |
@@ Line 809: / Line 809: @@
 | 27 008
 |-
-|37%
+|45%
 |}
 | align="center" |
@@ Line 815: / Line 815: @@
 | 68 464
 |-
-|33%
+|47%
 |}
 | align="center" |
@@ Line 821: / Line 821: @@
 | 157 184
 |-
-|31%
+|44%
 |}
 | align="center" |
@@ Line 827: / Line 827: @@
 | 332 688
 |-
-|28%
+|43%
 |}
 | align="center" |
@@ Line 833: / Line 833: @@
 | 658 048
 |-
-|27%
+|42%
 |}
 |-
@@ Line 854: / Line 854: @@
 | align="center" |
 {| border="2" style="background:#ABCDEF;"
-| 1 520
+| 3 649
 |-
-|47%
+|49%
 |}
 | align="center" |
 {| border="2" style="background:#ABCDEF;"
-| 4 551
+| 13 073
 |-
-|38%
+|45%
 |}
 | align="center" |
@@ Line 868: / Line 868: @@
 | 40 081
 |-
-|33%
+|44%
 |}
 | align="center" |
@@ Line 874: / Line 874: @@
 | 108545
 |-
-|30%
+|41%
 |}
 | align="center" |
@@ Line 880: / Line 880: @@
 | 265 729
 |-
-|27%
+|41%
 |}
 | align="center" |
@@ Line 886: / Line 886: @@
 | 598 417
 |-
-|25%
+|39%
 |}
 | align="center" |
@@ Line 892: / Line 892: @@
 | 1 256 465
 |-
-|24%
+|38%
 |}
 |}

Difference between revisions of "The Degree Diameter Problem for Circulant Graphs"

Revision as of 13:20, 7 March 2019

Table of the orders of the largest known circulant graphs

Table of the lowest upper bounds known at present, and the percentage of the order of the largest known graphs

References

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