Posts Tagged ‘optimal values’
The purpose of event dampening is reducing the effect of oscillations on routing systems. In general, periodic process that affect the routing system as a whole should have the period no shorter than the system convergence time (relaxation time). Otherwise, the system will never stabilize and will be constantly updating its state. In reality, complex system have multiple periodic processes running at the same time, which results is in harmonic process interference and complex process spectrum. Considering such behavior is outside the scope of this paper. What we want to do, is finding optimal settings to filter high-frequency events from the routing system. In our particular case, events are interface flaps, occurring periodically. We want to make sure that oscillations with period T or less are not reported to the routing system. Here T is found empirically, based on observed/estimated convergence time as suggested above.
Event dampening uses exponential back-off algorithm to suppress event reporting to the upper level protocols. Effectively, every time an interface flaps (goes down, to be accurate) a penalty value of P is added to the interface penalty counter. If at some point the accumulated penalty exceeds the “suppress” value of S, the interface is placed in the suppress state and further link events are not reported to the upper protocol modules. At all time, the interface penalty counter follows exponential decay process based on the formula P(t)=P(0)*2^(-t/H) where H is half-life time setting for the process. As soon as accumulated penalty reaches the lower boundary of R – the reuse value, interface is unsuppressed, and further changes are again reported to the upper level protocols.