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Cavity approximation for graphical models.

T Rizzo1, B Wemmenhove, H J Kappen

  • 1E Fermi Center, Via Panisperna 89A, Compendio del Viminale 00184, Rome, Italy.

Physical Review. E, Statistical, Nonlinear, and Soft Matter Physics
|August 7, 2007
PubMed
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We reformulated the cavity approximation (CA) for graphical models, enabling treatment of multivalued variables and arbitrary order interactions. This enhanced method offers increasingly precise estimates for model marginals with improved computational scaling.

Area of Science:

  • Statistical physics
  • Machine learning
  • Probabilistic graphical models

Background:

  • The Bethe approximation is a widely used method for estimating marginals in graphical models.
  • Existing cavity approximation (CA) algorithms improve Bethe approximation estimates but have limitations in handling multivalued variables and complex interactions.

Purpose of the Study:

  • To reformulate the cavity approximation (CA) for broader applicability.
  • To generalize CA to factor graphs with arbitrary order interaction factors.
  • To develop a message passing algorithm for the first-order corrected Bethe approximation.

Main Methods:

  • Reformulation of the cavity approximation (CA).
  • Generalization to factor graphs with arbitrary order interaction factors.

Related Experiment Videos

  • Development of a message passing algorithm for first-order correction.
  • Implementation of CA for pairwise interactions.
  • Main Results:

    • The reformulated CA handles multivalued variables and arbitrary order interactions.
    • CA[k] provides a sequence of approximations with increasing precision as k increases.
    • The error of the approximation of order k scales as 1/N(k+1) with system size N.
    • The computational complexity of the approximation of order k is O(N(k+1)).

    Conclusions:

    • The generalized cavity approximation offers a powerful framework for improving Bethe approximation estimates.
    • The precision of CA increases with the order of approximation, with predictable error scaling.
    • This work provides a foundation for further advancements in approximate inference for graphical models.