Sparse sums of squares on finite abelian groups and improved semidefinite lifts

Let G be a finite abelian group. This paper is concerned with nonnegative functions on G that are sparse with respect to the Fourier basis. We establish combinatorial conditions on subsets S and T of Fourier basis elements under which nonnegative functions with Fourier support S are sums of squares...

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Vydáno v:Mathematical programming Ročník 160; číslo 1-2; s. 149 - 191
Hlavní autoři: Fawzi, Hamza, Saunderson, James, Parrilo, Pablo A.
Médium: Journal Article
Jazyk:angličtina
Vydáno: Berlin/Heidelberg Springer Berlin Heidelberg 01.11.2016
Springer Nature B.V
Témata:
Boolean
Calculus of Variations and Optimal Control; Optimization
Combinatorics
Complexity
Computer engineering
Computer science
Construction
Decision support systems
Decomposition
Electrical engineering
Fourier analysis
Full Length Paper
Functions (mathematics)
Graphs
Laboratories
Linear programming
Mathematical analysis
Mathematical and Computational Physics
Mathematical Methods in Physics
Mathematical programming
Mathematics
Mathematics and Statistics
Mathematics of Computing
Numerical Analysis
Optimization
Polytopes
Semidefinite programming
Studies
Theoretical
52B12
90C22
52B55
ISSN:0025-5610, 1436-4646
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Shrnutí:Let G be a finite abelian group. This paper is concerned with nonnegative functions on G that are sparse with respect to the Fourier basis. We establish combinatorial conditions on subsets S and T of Fourier basis elements under which nonnegative functions with Fourier support S are sums of squares of functions with Fourier support T . Our combinatorial condition involves constructing a chordal cover of a graph related to G and S (the Cayley graph Cay ( G ^ , S ) ) with maximal cliques related to T . Our result relies on two main ingredients: the decomposition of sparse positive semidefinite matrices with a chordal sparsity pattern, as well as a simple but key observation exploiting the structure of the Fourier basis elements of G (the characters of G ). We apply our general result to two examples. First, in the case where G = Z 2 n , by constructing a particular chordal cover of the half-cube graph, we prove that any nonnegative quadratic form in n binary variables is a sum of squares of functions of degree at most n / 2 , establishing a conjecture of Laurent. Second, we consider nonnegative functions of degree d on Z N (when d divides N ). By constructing a particular chordal cover of the d th power of the N -cycle, we prove that any such function is a sum of squares of functions with at most 3 d log ( N / d ) nonzero Fourier coefficients. Dually this shows that a certain cyclic polytope in R 2 d with N vertices can be expressed as a projection of a section of the cone of positive semidefinite matrices of size 3 d log ( N / d ) . Putting N = d 2 gives a family of polytopes in R 2 d with linear programming extension complexity Ω ( d 2 ) and semidefinite programming extension complexity O ( d log ( d ) ) . To the best of our knowledge, this is the first explicit family of polytopes ( P d ) in increasing dimensions where xc PSD ( P d ) = o ( xc LP ( P d ) ) , where xc PSD and xc LP are respectively the SDP and LP extension complexity.
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ISSN:0025-5610
1436-4646
DOI:10.1007/s10107-015-0977-z