Accelerated Evolving Set Processes for Local PageRank Computation

Abstract

This work proposes a novel framework based on nested evolving set processes to accelerate Personalized PageRank (PPR) computation. At each stage of the process, we employ a localized inexact proximal point iteration to solve a simplified linear system. We show that the time complexity of such localized methods is upper bounded by \O(R2/ε2), O(m)\ to obtain an ε-approximation of the PPR vector, where m denotes the number of edges in the graph and R is a constant defined via nested evolving set processes. Furthermore, the algorithms induced by our framework require solving only O(1/α) such linear systems, where α is the damping factor. When 1/ε2 m, this implies the existence of an algorithm that computes an \ epsilon -approximation of the PPR vector with an overall time complexity of O(R2 / (αε2)), independent of the underlying graph size. Our result resolves an open conjecture from existing literature. Experimental results on real-world graphs validate the efficiency of our methods, demonstrating significant convergence in the early stages.

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