English

Single Pass Spectral Sparsification in Dynamic Streams

Data Structures and Algorithms 2015-04-17 v3

Abstract

We present the first single pass algorithm for computing spectral sparsifiers of graphs in the dynamic semi-streaming model. Given a single pass over a stream containing insertions and deletions of edges to a graph G, our algorithm maintains a randomized linear sketch of the incidence matrix of G into dimension O((1/epsilon^2) n polylog(n)). Using this sketch, at any point, the algorithm can output a (1 +/- epsilon) spectral sparsifier for G with high probability. While O((1/epsilon^2) n polylog(n)) space algorithms are known for computing "cut sparsifiers" in dynamic streams [AGM12b, GKP12] and spectral sparsifiers in "insertion-only" streams [KL11], prior to our work, the best known single pass algorithm for maintaining spectral sparsifiers in dynamic streams required sketches of dimension Omega((1/epsilon^2) n^(5/3)) [AGM14]. To achieve our result, we show that, using a coarse sparsifier of G and a linear sketch of G's incidence matrix, it is possible to sample edges by effective resistance, obtaining a spectral sparsifier of arbitrary precision. Sampling from the sketch requires a novel application of ell_2/ell_2 sparse recovery, a natural extension of the ell_0 methods used for cut sparsifiers in [AGM12b]. Recent work of [MP12] on row sampling for matrix approximation gives a recursive approach for obtaining the required coarse sparsifiers. Under certain restrictions, our approach also extends to the problem of maintaining a spectral approximation for a general matrix A^T A given a stream of updates to rows in A.

Keywords

Cite

@article{arxiv.1407.1289,
  title  = {Single Pass Spectral Sparsification in Dynamic Streams},
  author = {Michael Kapralov and Yin Tat Lee and Cameron Musco and Christopher Musco and Aaron Sidford},
  journal= {arXiv preprint arXiv:1407.1289},
  year   = {2015}
}
R2 v1 2026-06-22T04:55:36.779Z