Interiors of completely positive cones

Zhou, Anwa; Fan, Junxuan

doi:10.1007/s10898-015-0309-0

Cited by 4 publications

(3 citation statements)

References 27 publications

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“… 2015 ), to cite just a few. Another recent paper (Zhou and Fan 2015 ) deals with algorithmic strategies for factorization based upon conic optimization, for random instances of relatively moderate order .…”

Section: Various Cp Factorization Strategiesmentioning

confidence: 99%

Building a completely positive factorization

Bomze

2017

Cent Eur J Oper Res

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A symmetric matrix of order n is called completely positive if it has a symmetric factorization by means of a rectangular matrix with n columns and no negative entries (a so-called cp factorization), i.e., if it can be interpreted as a Gram matrix of n directions in the positive orthant of another Euclidean space of possibly different dimension. Finding this factor therefore amounts to angle packing and finding an appropriate embedding dimension. Neither the embedding dimension nor the directions may be unique, and so many cp factorizations of the same given matrix may coexist. Using a bordering approach, and building upon an already known cp factorization of a principal block, we establish sufficient conditions under which we can extend this cp factorization to the full matrix. Simulations show that the approach is promising also in higher dimensions.

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Section: Various Cp Factorization Strategiesmentioning

confidence: 99%

Building a completely positive factorization

Bomze

2017

Cent Eur J Oper Res

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“…If A is completely positive, (1.1) is called a nonnegative (or completely positive) decomposition of A. The completely positive tensor is an extension of the completely positive matrix [1,2,33,34,35]. For B ∈ S m (R n ), we define Bx m := 1≤i1,...,im≤n B i1,...,im x i1 • • • x im .…”

Section: Introductionmentioning

confidence: 99%

A semidefinite algorithm for completely positive tensor decomposition

Fan

Zhou

2016

Comput Optim Appl

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A symmetric tensor, which has a symmetric nonnegative decomposition, is called a completely positive tensor. We consider the completely positive tensor decomposition problem. A semidefinite algorithm is presented for checking whether a symmetric tensor is completely positive. If it is not completely positive, a certificate for it can be obtained; if it is completely positive, a nonnegative decomposition can be obtained.2000 Mathematics Subject Classification. Primary 15A18, 15A69, 90C22.

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“…By Nie's approach proposed in [27,28], Zhou and Fan [36] presented a semidefinite algorithm for the CP-matrix completion problem, which includes the CP checking as a special case; a CP-decomposition for a general CP-matrix can also be found by the algorithm. The approach is also applied to check interiors of the completely positive cone [37].…”

Section: Introductionmentioning

confidence: 99%

The CP-Matrix Approximation Problem

Fan

Zhou²

2016

SIAM J. Matrix Anal. & Appl.

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A symmetric matrix A is completely positive (CP) if there exists an entrywise nonnegative matrix V such that A = V V T . In this paper, we study the CP-matrix approximation problem of projecting a matrix onto the intersection of a set of linear constraints and the cone of CP matrices. We formulate the problem as the linear optimization with the norm cone and the cone of moments. A semidefinite algorithm is presented for the problem. A CP-decomposition of the projection matrix can also be obtained if the problem is feasible.Both CP n and COP n are proper cones (i.e. closed, pointed, convex and fulldimensional). Moreover, they are dual to each other [17]. A variety of NP-hard problems can be formulated as optimization problems over the completely positive cone or the copositive cone. Interested readers are referred to [2,6,7,8,4,12,15] for the work in the field.The important applications of the CP cone motivate people to study whether a matrix is CP or not. However, checking the membership in CP n has been shown NPhard, while checking the membership in COP n co-NP-hard [13,26]. It is generally difficult to treat CP n (or COP n ) directly. A standard approach is to approximate 2000 Mathematics Subject Classification. Primary: 90C20, 90C22, 90C26.

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Interiors of completely positive cones

Cited by 4 publications

References 27 publications

Building a completely positive factorization

Building a completely positive factorization

A semidefinite algorithm for completely positive tensor decomposition

The CP-Matrix Approximation Problem

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