2016
DOI: 10.1137/15m1052007
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Bounds for the Distance to the Nearest Correlation Matrix

Abstract: Abstract. In a wide range of practical problems correlation matrices are formed in such a way that, while symmetry and a unit diagonal are ensured, they may lack semidefiniteness. We derive a variety of new upper bounds for the distance from an arbitrary symmetric matrix to the nearest correlation matrix. The bounds are of two main classes: those based on the eigensystem and those based on a modified Cholesky factorization. Bounds from both classes have a computational cost of O(n 3 ) flops for a matrix of ord… Show more

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Cited by 7 publications
(5 citation statements)
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References 26 publications
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“…• https://github.com/higham/matrices-correlation-invalid: invalid correlation matrices collected by Higham and Strabić [36,37]. These are matrices that are intended to be correlation matrices but for various reasons relating to their construction have a negative eigenvalue and so are not positive semidefinite.…”
Section: Remote Groupsmentioning
confidence: 99%
“…• https://github.com/higham/matrices-correlation-invalid: invalid correlation matrices collected by Higham and Strabić [36,37]. These are matrices that are intended to be correlation matrices but for various reasons relating to their construction have a negative eigenvalue and so are not positive semidefinite.…”
Section: Remote Groupsmentioning
confidence: 99%
“…These techniques can be modified to apply weights to particular columns and rows, which may be useful if one has strong views that those assumptions are appropriate, or constrain an existing PSD sub-matrix to remain unchanged. See for example, Higham (2013).…”
Section: Calibration Of Copulas and Allowance For Tail Dependencementioning
confidence: 99%
“…We can apply the ALM in (28) to solve (31) with the subproblems being solved by the semismooth Newton-CG method. One nice feature of the nearest correlation matrix problem is that the constraints in (30) are always nondegenerate, making the semismooth Newton-CG method converging at least Q-superlinearly [43].…”
Section: Applications To Linear and Convex Quadratic Sdpmentioning
confidence: 99%
“…In our numerical experiments, we take the matrix G to be the indefinite symmetric matrices constructed from stock data by the investment company Orbis [30] (one with the matrix dimensions 1399 1399 and the other with dimensions 3210 ˆ3210), which are available at https://github.com/ higham/matrices-correlation-invalid. We randomly set some entries H i j " 0 (the corresponding G i j are thus treated as "missing" from the the observations) and the other entries H i j " 1.…”
Section: Applications To Linear and Convex Quadratic Sdpmentioning
confidence: 99%
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