On the cp-Rank and Minimal cp Factorizations of a Completely Positive Matrix

Shaked-Monderer, Naomi; Bomze, Immanuel M.; Jarre, Florian; Schachinger, Werner

doi:10.1137/120885759

Cited by 36 publications

(33 citation statements)

References 25 publications

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“…The conjecture was proved for triangle free graphs in [3], for graphs which contain no odd cycle on five or more vertices in [5], for all graphs on five vertices which are not the complete graph in [6], for nonnegative matrices with a positive semidefinite comparison matrix (and any graph) in [7] and for all 5 × 5 CP matrices in [8]. However, the general conjecture is still open.…”

Section: Introductionmentioning

confidence: 99%

The Drew–Johnson–Loewy conjecture for matrices over max–min semirings

Mohindru

2014

Linear and Multilinear Algebra

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Section: Introductionmentioning

confidence: 99%

The Drew–Johnson–Loewy conjecture for matrices over max–min semirings

Mohindru

2014

Linear and Multilinear Algebra

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“…(2) and (3) were proven in [20], and (4) follows directly from (3) and Theorem 3.3. The leftmost inequality in (5) follows from (4).…”

Section: Perron-frobenius Perturbationsmentioning

confidence: 77%

“…This proof is an adaptation of one from [20]. In fact, we will prove the more general result that considers M ∈ N n \ {O} with a P-F vector x ∈ R n ++ .…”

Section: Perron-frobenius Perturbationsmentioning

confidence: 91%

“…While (6) and (7) are well known since long, see for example [4], the bounds in (8) and (9) were established quite recently, namely in [8] and in [19], respectively. For n = 5 we have p n = n 2 /4 [20]. It was conjectured in [12] that this equality holds for all n ≥ 5, however counter examples to this conjecture for n = 7, .…”

Section: Perron-frobenius Perturbationsmentioning

confidence: 93%

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The structure of completely positive matrices according to their CP-rank and CP-plus-rank

Bomze

Dickinson

Still

2015

Linear Algebra and its Applications

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We study the topological properties of the cp-rank operator cp(A) and the related cp-plus-rank operator cp + (A) (which is introduced in this paper) in the set S n of symmetric n × n-matrices. For the set of completely positive matrices, CP n , we show that for any fixed p the set of matrices A satisfying cp(A) = cp + (A) = p is open in S n \ bd (CP n ). We also prove that the set A n of matrices with cp(A) = cp + (A) is dense in S n . By applying the theory of semi-algebraic sets we are able to show that membership in A n is even a generic property. We furthermore answer several questions on the existence of matrices satisfying cp(A) = cp + (A) or cp(A) = cp + (A), and establish genericity of having infinitely many minimal cp-decompositions.

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“…Shaked-Monderer, Bomze, Jarre & Schachinger [27] showed that the maximal CPrank of nˆn CP-matrices is attained at a positive definite matrix on bdpC n q. Denote R ǹ :" tx P R n | x ě 0u and R ǹ`: " tx P R n | x ą 0u. Dür & Still [15] characterized intpC n q as:…”

Section: Introductionmentioning

confidence: 99%

Interiors of completely positive cones

Zhou

Fan

2015

J Glob Optim

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ANWA ZHOU AND JINYAN FANÅ bstract. A symmetric matrix A is completely positive (CP) if there exists an entrywise nonnegative matrix B such that A " BB T . We characterize the interior of the CP cone. A semidefinite algorithm is proposed for checking interiors of the CP cone, and its properties are studied. A CP-decomposition of a matrix in Dickinson's form can be obtained if it is an interior of the CP cone. Some computational experiments are also presented. IntroductionA real nˆn symmetric matrix A is completely positive (CP) if there exist nonnegative vectors b 1 ,¨¨¨, b m P R n such that, where m is called the length of the decomposition (1.1). The smallest m in the above is called the CP-rank of A. If A is CP, we call (1.1) a CP-decomposition of A. Clearly, A is CP if and only if A " BB T for an entrywise nonnegative matrix B. Hence, a CP-matrix is not only positive semidefinite but also nonnegative entrywise.Let S n be the space of real nˆn symmetric matrices. For a cone C Ď S n , its dual cone is defined as C˚:" tG P S n : xA, Gy ě 0 for all A P Cu, where xA, Gy " tracepAGq is the trace inner product. Denote C n " tA P S n : A " BB T with B ě 0u, the completely positive cone, Cn " tG P S n : x T Gx ě 0 for all x ě 0u, the copositive cone.Both C n and Cn are proper cones (i.e. closed, pointed, convex and full-dimensional). Moreover, they are dual to each other [17]. The completely positive cone and copositive cone have wide applications in mixed binary quadratic programming [6], standard quadratic optimization problems and general quadratic programming [4], etc. Some NP-hard problems can also be formulated as linear optimization problems over the CP cone and the copositive cone (cf. [8]). We refer to [3,5,14] for the work in the field.The membership problems for the completely positive cone and the copositive cone are NP-hard (cf. [1,13]). To compute a CP-decomposition of a CP-matrix is also hard. Dickinson & Dür [9] studied the CP-checking and CP-decomposition of some sparse matrices. Sponseldur & Dür [28] used polyhedral approximations to project a matrix to C n ; a CP-decomposition of a matrix can be obtained if it 2000 Mathematics Subject Classification. Primary: 15A48, 65K05, 90C22, 90C26.

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On the cp-Rank and Minimal cp Factorizations of a Completely Positive Matrix

Cited by 36 publications

References 25 publications

The Drew–Johnson–Loewy conjecture for matrices over max–min semirings

The Drew–Johnson–Loewy conjecture for matrices over max–min semirings

The structure of completely positive matrices according to their CP-rank and CP-plus-rank

Interiors of completely positive cones

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