English

A simple inverse power method for balanced graph cut

Optimization and Control 2024-05-30 v1 Numerical Analysis Combinatorics Numerical Analysis Spectral Theory

Abstract

The existing inverse power (IP\mathbf{IP}) method for solving the balanced graph cut lacks local convergence and its inner subproblem requires a nonsmooth convex solver. To address these issues, we develop a simple inverse power (SIP\mathbf{SIP}) method using a novel equivalent continuous formulation of the balanced graph cut, and its inner subproblem allows an explicit analytic solution, which is the biggest advantage over IP\mathbf{IP} and constitutes the main reason why we call it simple\mathit{simple}. By fully exploiting the closed-form of the inner subproblem solution, we design a boundary-detected subgradient selection with which SIP\mathbf{SIP} is proved to be locally converged. We show that SIP\mathbf{SIP} is also applicable to a new ternary valued θ\theta-balanced cut which reduces to the balanced cut when θ=1\theta=1. When SIP\mathbf{SIP} reaches its local optimum, we seamlessly transfer to solve the θ\theta-balanced cut within exactly the same iteration algorithm framework and thus obtain SIP\mathbf{SIP}-perturb\mathbf{perturb} -- an efficient local breakout improvement of SIP\mathbf{SIP}, which transforms some ``partitioned" vertices back to the ``un-partitioned" ones through the adjustable θ\theta. Numerical experiments on G-set for Cheeger cut and Sparsest cut demonstrate that SIP\mathbf{SIP} is significantly faster than IP\mathbf{IP} while maintaining approximate solutions of comparable quality, and SIP\mathbf{SIP}-perturb\mathbf{perturb} outperforms Gurobi\mathtt{Gurobi} in terms of both computational cost and solution quality.

Keywords

Cite

@article{arxiv.2405.18705,
  title  = {A simple inverse power method for balanced graph cut},
  author = {Sihong Shao and Chuan Yang},
  journal= {arXiv preprint arXiv:2405.18705},
  year   = {2024}
}

Comments

24 pages, 10 figures

R2 v1 2026-06-28T16:44:57.300Z