2a03:32c0:e004::/48
2a03:32c0:e000::-2a03:32c0:efff:ffff:ffff:ffff:ffff:ffff: pool-net-akt
Route propagation
Route propagation
2a03:32c0:e004::/48 route propagation
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flowchart LR 23764["23764
CTGNet"] 6762["6762
Telecom Italia Sparkle"] 9957["9957
KINX"] 20473["20473
The Constant Company"] 206075["206075
Hollander & Jacobsen UG (haftungsbeschraenkt)"] 7195["7195
EdgeUno"] 53356["53356
Free Range Cloud Hosting Inc"] 137409["137409
Global Secure Layer"] 12389["12389
Rostelecom"] 3216["3216
VimpelCom"] 35133["35133
Eranium Transit"] 3491["3491
PCCW Global"] 34927["34927
FogNet - iFog GmbH"] 3257["3257
GTT Communications (AS3257)"] 50917["50917
BACKBONE.direct"] 48503["48503
Tele2 Kazakhstan"] 35104["35104
Kaztranscom"] 6830["6830
Liberty Global"] 31133["31133
MegaFon"] 9198["9198
Kazakhtelecom"] 43727["43727
KVANT-TELECOM"] 56655["56655
Gigahost AS"] 142064["142064
VergeTel Australia"] 6453["6453
TATA Communications Ltd"] 9002["9002
RETN"] 3356["3356
Lumen AS3356"] 6939["6939
Hurricane Electric"] 1299["1299
Arelion (Twelve99)"] 174["174
Cogent Communications, Inc."] 214677["214677
DeluxHost"] subgraph origins 48503 end 50917 --> 214677 class 50917 n214677 class 50917 n50917 class 50917 h50917 class 214677 n50917 class 214677 n214677 class 214677 h214677 3356 --> 6939 class 3356 n6939 class 3356 n3356 class 3356 h3356 class 6939 n3356 class 6939 n6939 class 6939 h6939 6762 --> 6939 class 6762 n6939 class 6762 n6762 class 6762 h6762 class 6939 n6762 class 6939 n6939 class 6939 h6939 48503 --> 9198 class 48503 n9198 class 48503 n48503 class 48503 h48503 class 9198 n48503 class 9198 n9198 class 9198 h9198 48503 --> 35104 class 48503 n35104 class 48503 n48503 class 48503 h48503 class 35104 n48503 class 35104 n35104 class 35104 h35104 43727 --> 7195 class 43727 n7195 class 43727 n43727 class 43727 h43727 class 7195 n43727 class 7195 n7195 class 7195 h7195 43727 --> 56655 class 43727 n56655 class 43727 n43727 class 43727 h43727 class 56655 n43727 class 56655 n56655 class 56655 h56655 43727 --> 31133 class 43727 n31133 class 43727 n43727 class 43727 h43727 class 31133 n43727 class 31133 n31133 class 31133 h31133 43727 --> 174 class 43727 n174 class 43727 n43727 class 43727 h43727 class 174 n43727 class 174 n174 class 174 h174 43727 --> 206075 class 43727 n206075 class 43727 n43727 class 43727 h43727 class 206075 n43727 class 206075 n206075 class 206075 h206075 43727 --> 6939 class 43727 n6939 class 43727 n43727 class 43727 h43727 class 6939 n43727 class 6939 n6939 class 6939 h6939 43727 --> 20473 class 43727 n20473 class 43727 n43727 class 43727 h43727 class 20473 n43727 class 20473 n20473 class 20473 h20473 43727 --> 137409 class 43727 n137409 class 43727 n43727 class 43727 h43727 class 137409 n43727 class 137409 n137409 class 137409 h137409 137409 --> 142064 class 137409 n142064 class 137409 n137409 class 137409 h137409 class 142064 n137409 class 142064 n142064 class 142064 h142064 12389 --> 6939 class 12389 n6939 class 12389 n12389 class 12389 h12389 class 6939 n12389 class 6939 n6939 class 6939 h6939 12389 --> 1299 class 12389 n1299 class 12389 n12389 class 12389 h12389 class 1299 n12389 class 1299 n1299 class 1299 h1299 12389 --> 3257 class 12389 n3257 class 12389 n12389 class 12389 h12389 class 3257 n12389 class 3257 n3257 class 3257 h3257 6453 --> 6830 class 6453 n6830 class 6453 n6453 class 6453 h6453 class 6830 n6453 class 6830 n6830 class 6830 h6830 6453 --> 3491 class 6453 n3491 class 6453 n6453 class 6453 h6453 class 3491 n6453 class 3491 n3491 class 3491 h3491 6453 --> 6939 class 6453 n6939 class 6453 n6453 class 6453 h6453 class 6939 n6453 class 6939 n6939 class 6939 h6939 23764 --> 9957 class 23764 n9957 class 23764 n23764 class 23764 h23764 class 9957 n23764 class 9957 n9957 class 9957 h9957 23764 --> 35133 class 23764 n35133 class 23764 n23764 class 23764 h23764 class 35133 n23764 class 35133 n35133 class 35133 h35133 7195 --> 20473 class 7195 n20473 class 7195 n7195 class 7195 h7195 class 20473 n7195 class 20473 n20473 class 20473 h20473 56655 --> 53356 class 56655 n53356 class 56655 n56655 class 56655 h56655 class 53356 n56655 class 53356 n53356 class 53356 h53356 9002 --> 34927 class 9002 n34927 class 9002 n9002 class 9002 h9002 class 34927 n9002 class 34927 n34927 class 34927 h34927 35104 --> 43727 class 35104 n43727 class 35104 n35104 class 35104 h35104 class 43727 n35104 class 43727 n43727 class 43727 h43727 35104 --> 6453 class 35104 n6453 class 35104 n35104 class 35104 h35104 class 6453 n35104 class 6453 n6453 class 6453 h6453 3216 --> 3356 class 3216 n3356 class 3216 n3216 class 3216 h3216 class 3356 n3216 class 3356 n3356 class 3356 h3356 1299 --> 6939 class 1299 n6939 class 1299 n1299 class 1299 h1299 class 6939 n1299 class 6939 n6939 class 6939 h6939 9198 --> 12389 class 9198 n12389 class 9198 n9198 class 9198 h9198 class 12389 n9198 class 12389 n12389 class 12389 h12389 9198 --> 3216 class 9198 n3216 class 9198 n9198 class 9198 h9198 class 3216 n9198 class 3216 n3216 class 3216 h3216 9198 --> 23764 class 9198 n23764 class 9198 n9198 class 9198 h9198 class 23764 n9198 class 23764 n23764 class 23764 h23764 9198 --> 43727 class 9198 n43727 class 9198 n9198 class 9198 h9198 class 43727 n9198 class 43727 n43727 class 43727 h43727 9198 --> 9002 class 9198 n9002 class 9198 n9198 class 9198 h9198 class 9002 n9198 class 9002 n9002 class 9002 h9002 9957 --> 20473 class 9957 n20473 class 9957 n9957 class 9957 h9957 class 20473 n9957 class 20473 n20473 class 20473 h20473 31133 --> 6939 class 31133 n6939 class 31133 n31133 class 31133 h31133 class 6939 n31133 class 6939 n6939 class 6939 h6939 31133 --> 1299 class 31133 n1299 class 31133 n31133 class 31133 h31133 class 1299 n31133 class 1299 n1299 class 1299 h1299 31133 --> 174 class 31133 n174 class 31133 n31133 class 31133 h31133 class 174 n31133 class 174 n174 class 174 h174 31133 --> 6762 class 31133 n6762 class 31133 n31133 class 31133 h31133 class 6762 n31133 class 6762 n6762 class 6762 h6762 35133 --> 50917 class 35133 n50917 class 35133 n35133 class 35133 h35133 class 50917 n35133 class 50917 n50917 class 50917 h50917 subgraph neighbors 214677 20473 206075 53356 142064 34927 end subgraph tier1 174 1299 3257 3356 3491 6453 6762 6830 6939 end style tier1 fill:#e0f0ff,stroke:#666