Gabor Retvari (Budapest University (BME-TMIT))
Wednesday, 26.11.2014, 11:30
Many of our computer networks, not the least of which the Internet, are built upon hop-by-hop destination-based routing. Here, network devices are equipped with a unique address and routers use giant lookup tables to forward packets towards the intended destination based on the address encoded in the header. At the moment, it is not clear whether we will be able to scale the hop-by-hop routing paradigm into the future economically, as the memory requirement for storing these giant lookup tables keeps on increasing at a fast pace. The main goal of this talk is to highlight some recent results in the related research field on routing scalability.
First, we present the fundamental impossibility result of the field, asserting that no routing scheme can achieve better than linearly increasing routing tables in general. We extend this result from shortest-path routing to general routing policies using an algebraic approach and, for the special case of BGP, we state a Separation Theorem that divides scalable BGP routing policies from unscalable ones. We then do a reality check: we show that IP forwarding tables used in Internet routers can be compressed way beyond what the worst-case analysis would suggest. To do so, we systematically squeeze out every single bit of redundancy from the most common forwarding table data structure, the prefix tree. We find that compression in this case not only does not ruin lookup performance but it even improves it, so this one turns out to be one of those rare cases in computer science when there is no space-time trade-off. Finally, we speculate about the reasons behind this seemingly magical compressibility of IP forwarding tables. We present preliminary analysis suggesting that some form of "heterogeneity" might be a main factor behind compressibility, we attempt to characterize this notion using the concept of certain routing table symmetries, and then we sketch the scalability map of the Internet which we then use to make some bold predictions.
Gábor Rétvári received the M.Sc. and Ph.D. degrees in electrical engineering from the Budapest University of Technology and Economics (BME). He is now a Senior Research Fellow at the High Speed Networks Laboratory, BME. He has been passionate about the questions of routing scalability for a long time and he has done plenty of research in this field, using a diverse set of mathematical tools ranging from abstract algebra to computational geometry and, more recently, information-theory. He maintains numerous open source scientific tools written in Perl, C and Haskell.