2602:81d:2::/48
2602:81d::-2602:81d:f:ffff:ffff:ffff:ffff:ffff: CATHRON INFORMATION CONSULTING
Route propagation
Route propagation
2602:81d:2::/48 route propagation
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flowchart LR 54891["54891
BC-2288"] 1299["1299
Arelion (Twelve99)"] 53356["53356
Free Range Cloud Hosting Inc"] 2914["2914
NTT Global IP Network"] 3320["3320
Deutsche Telekom"] 174["174
Cogent Communications, Inc."] 835["835
GoCodeIT AS835"] 3356["3356
Lumen AS3356"] 6461["6461
Zayo"] 5511["5511
Orange"] 3491["3491
PCCW Global"] 6939["6939
Hurricane Electric"] 3257["3257
GTT Communications (AS3257)"] 11670["11670
TorIX Route Servers"] 33554["33554
Neutral Data"] subgraph origins 54891 end 54891 --> 835 class 54891 n835 class 54891 n54891 class 54891 h54891 class 835 n54891 class 835 n835 class 835 h835 835 --> 1299 class 835 n1299 class 835 n835 class 835 h835 class 1299 n835 class 1299 n1299 class 1299 h1299 835 --> 53356 class 835 n53356 class 835 n835 class 835 h835 class 53356 n835 class 53356 n53356 class 53356 h53356 835 --> 6939 class 835 n6939 class 835 n835 class 835 h835 class 6939 n835 class 6939 n6939 class 6939 h6939 835 --> 3257 class 835 n3257 class 835 n835 class 835 h835 class 3257 n835 class 3257 n3257 class 3257 h3257 835 --> 6461 class 835 n6461 class 835 n835 class 835 h835 class 6461 n835 class 6461 n6461 class 6461 h6461 835 --> 11670 class 835 n11670 class 835 n835 class 835 h835 class 11670 n835 class 11670 n11670 class 11670 h11670 11670 --> 33554 class 11670 n33554 class 11670 n11670 class 11670 h11670 class 33554 n11670 class 33554 n33554 class 33554 h33554 33554 --> 53356 class 33554 n53356 class 33554 n33554 class 33554 h33554 class 53356 n33554 class 53356 n53356 class 53356 h53356 1299 --> 2914 class 1299 n2914 class 1299 n1299 class 1299 h1299 class 2914 n1299 class 2914 n2914 class 2914 h2914 1299 --> 3257 class 1299 n3257 class 1299 n1299 class 1299 h1299 class 3257 n1299 class 3257 n3257 class 3257 h3257 1299 --> 6939 class 1299 n6939 class 1299 n1299 class 1299 h1299 class 6939 n1299 class 6939 n6939 class 6939 h6939 1299 --> 3320 class 1299 n3320 class 1299 n1299 class 1299 h1299 class 3320 n1299 class 3320 n3320 class 3320 h3320 1299 --> 5511 class 1299 n5511 class 1299 n1299 class 1299 h1299 class 5511 n1299 class 5511 n5511 class 5511 h5511 1299 --> 3491 class 1299 n3491 class 1299 n1299 class 1299 h1299 class 3491 n1299 class 3491 n3491 class 3491 h3491 6939 --> 2914 class 6939 n2914 class 6939 n6939 class 6939 h6939 class 2914 n6939 class 2914 n2914 class 2914 h2914 6939 --> 3356 class 6939 n3356 class 6939 n6939 class 6939 h6939 class 3356 n6939 class 3356 n3356 class 3356 h3356 6939 --> 3491 class 6939 n3491 class 6939 n6939 class 6939 h6939 class 3491 n6939 class 3491 n3491 class 3491 h3491 6939 --> 1299 class 6939 n1299 class 6939 n6939 class 6939 h6939 class 1299 n6939 class 1299 n1299 class 1299 h1299 3257 --> 6939 class 3257 n6939 class 3257 n3257 class 3257 h3257 class 6939 n3257 class 6939 n6939 class 6939 h6939 3257 --> 1299 class 3257 n1299 class 3257 n3257 class 3257 h3257 class 1299 n3257 class 1299 n1299 class 1299 h1299 3257 --> 3356 class 3257 n3356 class 3257 n3257 class 3257 h3257 class 3356 n3257 class 3356 n3356 class 3356 h3356 3257 --> 174 class 3257 n174 class 3257 n3257 class 3257 h3257 class 174 n3257 class 174 n174 class 174 h174 6461 --> 6939 class 6461 n6939 class 6461 n6461 class 6461 h6461 class 6939 n6461 class 6939 n6939 class 6939 h6939 6461 --> 3257 class 6461 n3257 class 6461 n6461 class 6461 h6461 class 3257 n6461 class 3257 n3257 class 3257 h3257 6461 --> 1299 class 6461 n1299 class 6461 n6461 class 6461 h6461 class 1299 n6461 class 1299 n1299 class 1299 h1299 subgraph neighbors 835 53356 end subgraph tier1 174 1299 2914 3257 3320 3356 3491 5511 6461 6939 end style tier1 fill:#e0f0ff,stroke:#666