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SPAA
2006
ACM
2006
ACM
On space-stretch trade-offs: lower bounds
One of the fundamental trade-offs in compact routing schemes is between the space used to store the routing table on each node and the stretch factor of the routing scheme – the ratio between the cost of the route induced by the scheme and the cost of a minimum cost path between the same pair. Using a distributed Kolmogorov Complexity argument, we give a lower bound for the name-independent model that applies even to single-source schemes and does not require a girth conjecture. For any integer k ≥ 1 we prove that any routing scheme for networks with arbitrary weights and arbitrary node names (even a single-source routing scheme) with maximum stretch strictly less than 2k + 1 requires Ω((n log n)1/k )-bit routing tables. We extend our results to lower bound the average-stretch, showing that for any integer k ≥ 1 any name-independent routing scheme with (n/(9k))1/k -bit routing tables has average-stretch of at least k/4 + 7/8. This result is in sharp contrast to recent results...
Real-time TrafficCompact Routing Schemes | Distributed And Parallel Computing | Routing Schemes | Routing Tables | SPAA 2006 |
Related Content
| Added | 14 Jun 2010 |
| Updated | 14 Jun 2010 |
| Type | Conference |
| Year | 2006 |
| Where | SPAA |
| Authors | Ittai Abraham, Cyril Gavoille, Dahlia Malkhi |
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