Complete characterization of Hadamard powers preserving Loewner positivity, monotonicity, and convexity

Guillot, Dominique; Khare, Apoorva; Rajaratnam, Bala

doi:10.1016/j.jmaa.2014.12.048

Cited by 26 publications

(44 citation statements)

References 21 publications

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“…Power Symmetric Matrices and Construction of PPT States. This section has been motivated by the work on "Power symmetric matrics" by Sinkhorn [81] and its generalization by Bapat, Jain and Prasad [5] on one hand and preservation of positivity of a block matrix under taking powers of blocks, the so-called Schur or Hadamard product by Choudhury [16] and Guillot, Khare and Rajaratnam [34] on the other. The purpose is to illustrate the interesting interplay rather than the utmost generality.…”

Section: Now the Matrixmentioning

confidence: 99%

“…In that spirit, Guillot, Khare and Rajaratanam [34] give interesting further developments, but reveal that actions of replacing α by other numbers or relaxing the conditions limit the possibility of preserving the positive semi-definiteness and that of its application to the construction of PPT states.…”

Section: C Positivity Of Block Matrices and Schur Or Hadamard Prodmentioning

confidence: 99%

“…Jain and K. Manjunatha Prasad [5]. Techniques developed by D. Choudhury [16] and D. Guillot, A. Khare and B. Rajaratnam [34] help to some extent. The fourth section is devoted to the concept of unitary equivalence of a matrix to its transpose and its general form obtained by S.R.…”

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confidence: 99%

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Role Of Partial Transpose And Generalized Choi Maps In Quantum Dynamical Semigroups Involving Separable And Entangled States

Singh

2015

ELA

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Abstract. Power symmetric matrices defined and studied by R. Sinkhorn (1981) and their generalization by R.B. Bapat, S.K. Jain and K. Manjunatha Prasad (1999) have been utilized to give positive block matrices with trace one possessing positive partial transpose, the so-called PPT states. Another method to construct such PPT states is given, it uses the form of a matrix unitarily equivalent to its transpose obtained by S.R. Garcia and J.E. Tener (2012). Evolvement or suppression of separability or entanglement of various levels for a quantum dynamical semigroup of completely positive maps has been studied using Choi-Jamiolkowsky matrix of such maps and the famous Horodecki's criteria (1996). A Trichotomy Theorem has been proved, and examples have been given that depend mainly on generalized Choi maps and clearly distinguish the levels of entanglement breaking.

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Section: Now the Matrixmentioning

confidence: 99%

Section: C Positivity Of Block Matrices and Schur Or Hadamard Prodmentioning

confidence: 99%

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Role Of Partial Transpose And Generalized Choi Maps In Quantum Dynamical Semigroups Involving Separable And Entangled States

Singh

2015

ELA

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“…Motivated by problems occurring in statistics, Guilllot, Khare and Rajaratnam have been studying various problems related to Hadamard powers. See [7,8].…”

Section: Introductionmentioning

confidence: 99%

Hadamard powers of some positive matrices

Jain

2017

Linear Algebra and its Applications

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Positivity properties of the Hadamard powers of the matrix 1 + x i x j for distinct positive real numbers x 1 , . . . , x n and the matrix | cos((i − j)π/n)| are studied. In particular, it is shown that (1 + x i x j ) r is not positive semidefinite for any positive real number r < n−2 that is not an integer, and | cos((i − j)π/n)| r is positive semidefinite for every odd integer n ≥ 3 and n − 3 ≤ r < n − 2.2010 Mathematics Subject Classification. 15B48, 15A45.

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“…Rank constraints and other Loewner properties. Another approach to generalize Theorem 6.1 is to examine other properties of entrywise functions such as monotonicity, convexity, and super-additivity (with respect to the Loewner semidefinite ordering)[78,68]. Given a set V ⊂ P N (I), recall that a function f :I → R is • positive on V withrespect to the Loewner ordering if f [A] ≥ 0 for all 0 ≤ A ∈ V ; • monotone on V with respect to the Loewner ordering if f [A] ≥ f [B] for all A, B ∈ V such that A ≥ B ≥ 0; • convex on V with respect to the Loewner ordering if f [λA + (1 − λ)B] ≤ λf [A] + (1 − λ)f [B] for all λ[0, 1] and all A, B ∈ V such that A ≥ B ≥ 0; • super-additive on V with respect to the Loewner ordering if f [A +…”

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A Panorama of Positivity. I: Dimension Free

Belton¹,

Guillot²,

Khare³

et al. 2019

Trends in Mathematics

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This survey contains a selection of topics unified by the concept of positive semi-definiteness (of matrices or kernels), reflecting natural constraints imposed on discrete data (graphs or networks) or continuous objects (probability or mass distributions). We put emphasis on entrywise operations which preserve positivity, in a variety of guises. Techniques from harmonic analysis, function theory, operator theory, statistics, combinatorics, and group representations are invoked. Some partially forgotten classical roots in metric geometry and distance transforms are presented with comments and full bibliographical references. Modern applications to high-dimensional covariance estimation and regularization are included.

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Complete characterization of Hadamard powers preserving Loewner positivity, monotonicity, and convexity

Cited by 26 publications

References 21 publications

Role Of Partial Transpose And Generalized Choi Maps In Quantum Dynamical Semigroups Involving Separable And Entangled States

Role Of Partial Transpose And Generalized Choi Maps In Quantum Dynamical Semigroups Involving Separable And Entangled States

Hadamard powers of some positive matrices

A Panorama of Positivity. I: Dimension Free

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