• DocumentCode
    580009
  • Title

    Computing Multiplicities of Lie Group Representations

  • Author

    Christandl, Matthias ; Doran, Brent ; Walter, Michael

  • Author_Institution
    Dept. of Phys., ETH Zurich, Zürich, Switzerland
  • fYear
    2012
  • fDate
    20-23 Oct. 2012
  • Firstpage
    639
  • Lastpage
    648
  • Abstract
    For fixed compact connected Lie groups H ⊆ G, we provide a polynomial time algorithm to compute the multiplicity of a given irreducible representation of H in the restriction of an irreducible representation of G. Our algorithm is based on a finite difference formula which makes the multiplicities amenable to Barvinok´s algorithm for counting integral points in polytopes. The Kronecker coefficients of the symmetric group, which can be seen to be a special case of such multiplicities, play an important role in the geometric complexity theory approach to the P vs. NP problem. Whereas their computation is known to be #P-hard for Young diagrams with an arbitrary number of rows, our algorithm computes them in polynomial time if the number of rows is bounded. We complement our work by showing that information on the asymptotic growth rates of multiplicities in the coordinate rings of orbit closures does not directly lead to new complexity-theoretic obstructions beyond what can be obtained from the moment polytopes of the orbit closures. Nonasymptotic information on the multiplicities, such as provided by our algorithm, may therefore be essential in order to find obstructions in geometric complexity theory.
  • Keywords
    Lie groups; computational complexity; computational geometry; finite difference methods; #P-hard; Barvinok algorithm; Kronecker coefficients; Lie group representations; NP problem; P problem; Young diagrams; asymptotic growth rates; coordinate rings; finite difference formula; fixed compact connected Lie groups; geometric complexity theory; integral points; irreducible representation; moment polytopes; multiplicity computation; orbit closures; polynomial time algorithm; symmetric group; Complexity theory; Extraterrestrial measurements; Lattices; Physics; Polynomials; Vectors;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Foundations of Computer Science (FOCS), 2012 IEEE 53rd Annual Symposium on
  • Conference_Location
    New Brunswick, NJ
  • ISSN
    0272-5428
  • Print_ISBN
    978-1-4673-4383-1
  • Type

    conf

  • DOI
    10.1109/FOCS.2012.43
  • Filename
    6375343