1 research outputs found
Sampling and Uniqueness Sets in Graphon Signal Processing
In this work, we study the properties of sampling sets on families of large
graphs by leveraging the theory of graphons and graph limits. To this end, we
extend to graphon signals the notion of removable and uniqueness sets, which
was developed originally for the analysis of signals on graphs. We state the
formal definition of a removable set and conditions under which a
bandlimited graphon signal can be represented in a unique way when its samples
are obtained from the complement of a given removable set in the
graphon. By leveraging such results we show that graphon representations of
graphs and graph signals can be used as a common framework to compare sampling
sets between graphs with different numbers of nodes and edges, and different
node labelings. Additionally, given a sequence of graphs that converges to a
graphon, we show that the sequences of sampling sets whose graphon
representation is identical in are convergent as well. We exploit the
convergence results to provide an algorithm that obtains approximately close to
optimal sampling sets. Performing a set of numerical experiments, we evaluate
the quality of these sampling sets. Our results open the door for the efficient
computation of optimal sampling sets in graphs of large size