2 research outputs found
Learning-Augmented Weighted Paging
We consider a natural semi-online model for weighted paging, where at any
time the algorithm is given predictions, possibly with errors, about the next
arrival of each page. The model is inspired by Belady's classic optimal offline
algorithm for unweighted paging, and extends the recently studied model for
learning-augmented paging (Lykouris and Vassilvitskii, 2018) to the weighted
setting.
For the case of perfect predictions, we provide an -competitive
deterministic and an -competitive randomized algorithm, where
is the number of distinct weight classes. Both these bounds are tight,
and imply an - and -competitive ratio, respectively,
when the page weights lie between and . Previously, it was not known how
to use these predictions in the weighted setting and only bounds of and
were known, where is the cache size. Our results also
generalize to the interleaved paging setting and to the case of imperfect
predictions, with the competitive ratios degrading smoothly from and
to and , respectively, as the prediction error
increases.
Our results are based on several insights on structural properties of
Belady's algorithm and the sequence of page arrival predictions, and novel
potential functions that incorporate these predictions. For the case of
unweighted paging, the results imply a very simple potential function based
proof of the optimality of Belady's algorithm, which may be of independent
interest