Complexity of Classical Acceleration for 1-Regularized PageRank

Abstract

We study the degree-weighted work required to compute 1-regularized PageRank using the standard accelerated proximal-gradient method (FISTA). For non-accelerated methods (ISTA), the best known worst-case work is O((α)-1), where α is the teleportation parameter and is the 1-regularization parameter. It is not known whether classical acceleration methods can improve 1/α to 1/α while preserving the 1/ locality scaling, or whether they can be asymptotically worse. For FISTA, we show a negative result by constructing a family of instances for which standard FISTA is asymptotically worse than ISTA. On the positive side, we analyze FISTA on a slightly over-regularized objective and show that, under a confinement condition, all spurious activations remain inside a boundary set B. This yields a bound consisting of an accelerated (α)-1(α/) term plus a boundary overhead vol(B)/(α3/2). We also provide graph-structural sufficient conditions that imply such confinement.