Savings in switching costs of an
optical cross-connect can be achieved by grouping together a set of consecutive
wavelengths and switching them as a single waveband. This technique is known as
waveband switching. While previous work has focused on either uniform band
sizes or non uniform band sizes considering a single node, in this paper we
focus on the number of wavebands and their sizes for ring topologies. First, we
show that such solutions are inadequate when considering the entire network. We
then present a novel framework for optimizing the number of wavebands in a ring
network for deterministic traffic. The objective of the Band Minimization
Problem is to minimize the number of non uniform wavebands in the network while
using the minimum possible number of wavelengths. We show that the problem is
NP-hard and present heuristics for it. We then consider a specific type of traffic,
namely all-to-all traffic, and present a construction method for achieving the
minimum number of wavebands in the ring. Our results show that the number of
ports can be reduced by a large amount using waveband switching compared to
wavelength switching, for both all-to-all traffic and random traffic. We also
numerically evaluate the performance of our waveband design algorithms under
dynamic stochastic traffic.
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