Title of article
On the Hardness of Equal Shortest Path Routing
Author/Authors
Giroire، نويسنده , , Frédéric and Pérennes، نويسنده , , Stéphane and Tahiri، نويسنده , , Issam، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2013
Pages
8
From page
439
To page
446
Abstract
In telecommunication networks packets are carried from a source s to a destination t on a path that is determined by the underlying routing protocol. Most routing protocols belong to the class of shortest path routing protocols. In such protocols, the network operator assigns a length to each link. A packet going from s to t follows a shortest path according to these lengths. For better protection and efficiency, one wishes to use multiple (shortest) paths between two nodes. Therefore the routing protocol must determine how the traffic from s to t is distributed among the shortest paths. In the protocol called OSPF-ECMP (for Open Shortest Path First-Equal Cost Multiple Path) the traffic incoming at every node is uniformly balanced on all outgoing links that are on shortest paths. In that context, the operator task is to determine the “best” link lengths, toward a goal such as maximizing the network throughput for given link capacities.
s work, we show that the problem of maximizing even a single commodity flow for the OSPF-ECMP protocol cannot be approximated within any constant factor ratio. Besides this main theorem, we derive some positive results which include polynomial-time approximations and an exponential-time exact algorithm. We also prove that despite their weakness, our approximation and exact algorithms are, in a sense, the best possible.
Keywords
OSPF-ECMP , max flow , approximation , NP-Hard
Journal title
Electronic Notes in Discrete Mathematics
Serial Year
2013
Journal title
Electronic Notes in Discrete Mathematics
Record number
1456250
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