An Adaptive Total Variation Algorithm for Computing the Balanced Cut of a Graph

Xavier Bresson, Thomas Laurent, David Uminsky, James H. von Brecht

Research output: Contribution to journalArticlepeer-review

Abstract

We propose an adaptive version of the total variation algorithm proposed in [3] for computing the balanced cut of a graph. The algorithm from [3] used a sequence of inner total variation minimizations to guarantee descent of the balanced cut energy as well as convergence of the algorithm. In practice the total variation minimization step is never solved exactly. Instead, an accuracy parameter is specified and the total variation minimization terminates once this level of accuracy is reached. The choice of this parameter can vastly impact both the computational time of the overall algorithm as well as the accuracy of the result. Moreover, since the total variation minimization step is not solved exactly, the algorithm is not guarantied to be monotonic. In the present work we introduce a new adaptive stopping condition for the total variation minimization that guarantees monotonicity. This results in an algorithm that is actually monotonic in practice and is also significantly faster than previous, non-adaptive algorithms.

Original languageAmerican English
Pages (from-to)1-12
Number of pages12
JournalAn Adaptive Total Variation Algorithm for Computing the Balanced Cut of a Graph
StatePublished - Feb 12 2013

Keywords

  • optimization
  • control

Disciplines

  • Mathematics

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