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22 results on '"Hiai, F."'

1. Anti Lie-Trotter formula

Author

Audenaert, K. M. R. and Hiai, F.

Subjects
Mathematics - Functional Analysis, 15A42, 15A16, 47A64
Abstract

Let $A$ and $B$ be positive semidefinite matrices. The limit of the expression $Z_p:=(A^{p/2}B^pA^{p/2})^{1/p}$ as $p$ tends to $0$ is given by the well known Lie-Trotter-Kato formula. A similar formula holds for the limit of $G_p:=(A^p\,\#\,B^p)^{2/p}$ as $p$ tends to $0$, where $X\,\#\,Y$ is the geometric mean of $X$ and $Y$. In this paper we study the complementary limit of $Z_p$ and $G_p$ as $p$ tends to $\infty$, with the ultimate goal of finding an explicit formula, which we call the anti Lie-Trotter formula. We show that the limit of $Z_p$ exists and find an explicit formula in a special case. The limit of $G_p$ is shown for $2\times2$ matrices only., Comment: 26 pages

Published
2014

2. Quantum f-divergences and error correction

Author

Hiai, F., Mosonyi, M., Petz, D., and Beny, C.

Subjects
Mathematical Physics, Computer Science - Information Theory, Quantum Physics
Abstract

Quantum f-divergences are a quantum generalization of the classical notion of f-divergences, and are a special case of Petz' quasi-entropies. Many well known distinguishability measures of quantum states are given by, or derived from, f-divergences; special examples include the quantum relative entropy, the Renyi relative entropies, and the Chernoff and Hoeffding measures. Here we show that the quantum f-divergences are monotonic under the dual of Schwarz maps whenever the defining function is operator convex. This extends and unifies all previously known monotonicity results. We also analyze the case where the monotonicity inequality holds with equality, and extend Petz' reversibility theorem for a large class of f-divergences and other distinguishability measures. We apply our findings to the problem of quantum error correction, and show that if a stochastic map preserves the pairwise distinguishability on a set of states, as measured by a suitable f-divergence, then its action can be reversed on that set by another stochastic map that can be constructed from the original one in a canonical way. We also provide an integral representation for operator convex functions on the positive half-line, which is the main ingredient in extending previously known results on the monotonicity inequality and the case of equality. We also consider some special cases where the convexity of f is sufficient for the monotonicity, and obtain the inverse Holder inequality for operators as an application. The presentation is completely self-contained and requires only standard knowledge of matrix analysis., Comment: v6: An error in Proposition 2.12 (on the continuity of the quantum f-divergences) has been corrected, and the proofs of Theorem 4.3 and Proposition A.3 have been updated accordingly. No change in the main content of the paper. See also Proposition 3.8 and Appendix D in arXiv:1604.03089v4 for the continuity properties of quantum f-divergences

Published
2010
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3. On the quantum Renyi relative entropies and related capacity formulas

Author

Mosonyi, M. and Hiai, F.

Subjects
Quantum Physics
Abstract

We show that the quantum $\alpha$-relative entropies with parameter $\alpha\in (0,1)$ can be represented as generalized cutoff rates in the sense of [I. Csiszar, IEEE Trans. Inf. Theory 41, 26-34, (1995)], which provides a direct operational interpretation to the quantum $\alpha$-relative entropies. We also show that various generalizations of the Holevo capacity, defined in terms of the $\alpha$-relative entropies, coincide for the parameter range $\alpha\in (0,2]$, and show an upper bound on the one-shot epsilon-capacity of a classical-quantum channel in terms of these capacities., Comment: v4: Cutoff rates are treated for correlated hypotheses, some proofs are given in greater detail

Published
2009
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4. Riemannian metrics on positive definite matrices related to means

Author

Hiai, F. and Petz, D.

Subjects
Mathematical Physics, Mathematics - Functional Analysis, 15A45, 15A48, 53B21, 53C22
Abstract

The Riemannian metric on the manifold of positive definite matrices is defined by a kernel function $\phi$ in the form $K_D^\phi(H,K)=\sum_{i,j}\phi(\lambda_i,\lambda_j)^{-1} Tr P_iHP_jK$ when $\sum_i\lambda_iP_i$ is the spectral decomposition of the foot point $D$ and the Hermitian matrices $H,K$ are tangent vectors. For such kernel metrics the tangent space has an orthogonal decomposition. The pull-back of a kernel metric under a mapping $D\mapsto G(D)$ is a kernel metric as well. Several Riemannian geometries of the literature are particular cases, for example, the Fisher-Rao metric for multivariate Gaussian distributions and the quantum Fisher information. In the paper the case $\phi(x,y)=M(x,y)^\theta$ is mostly studied when $M(x,y)$ is a mean of the positive numbers $x$ and $y$. There are results about the geodesic curves and geodesic distances. The geometric mean, the logarithmic mean and the root mean are important cases., Comment: 28 pages

Published
2008

5. Asymptotic distinguishability measures for shift-invariant quasi-free states of fermionic lattice systems

Author

Mosonyi, M., Hiai, F., Ogawa, T., and Fannes, M.

Subjects
Quantum Physics, Mathematical Physics
Abstract

We apply the recent results of F. Hiai, M. Mosonyi and T. Ogawa [arXiv:0707.2020, to appear in J. Math. Phys.] to the asymptotic hypothesis testing problem of locally faithful shift-invariant quasi-free states on a CAR algebra. We use a multivariate extension of Szego's theorem to show the existence of the mean Chernoff and Hoeffding bounds and the mean relative entropy, and show that these quantities arise as the optimal error exponents in suitable settings., Comment: Results extended to higher dimensional lattices, title changed. Submitted version

Published
2008
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6. A new approach to mutual information

Author

Hiai, F. and Petz, D.

Subjects
Mathematics - Probability, Mathematics - Statistics Theory, 62B10, 94A17
Abstract

A new expression as a certain asymptotic limit via "discrete micro-states" of permutations is provided to the mutual information of both continuous and discrete random variables., Comment: 14 pages

Published
2007

7. A limit relation for entropy and channel capacity per unit cost

Author

Csiszar, I., Hiai, F., and Petz, D.

Subjects
Quantum Physics, Computer Science - Information Theory
Abstract

In a quantum mechanical model, Diosi, Feldmann and Kosloff arrived at a conjecture stating that the limit of the entropy of certain mixtures is the relative entropy as system size goes to infinity. The conjecture is proven in this paper for density matrices. The first proof is analytic and uses the quantum law of large numbers. The second one clarifies the relation to channel capacity per unit cost for classical-quantum channels. Both proofs lead to generalization of the conjecture., Comment: LATEX file, 11 pages

Published
2007
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8. Large deviations for functions of two random projection matrices

Author

Hiai, F. and Petz, D.

Subjects
Mathematics - Operator Algebras, Mathematics - Probability, 15A52, 60F10, 46L54
Abstract

In this paper two independent and unitarily invariant projection matrices P(N) and Q(N) are considered and the large deviation is proven for the eigenvalue density of all polynomials of them as the matrix size $N$ converges to infinity. The result is formulated on the tracial state space $TS({\cal A})$ of the universal $C^*$-algebra ${\cal A}$ generated by two selfadjoint projections. The random pair $(P(N),Q(N))$ determines a random tracial state $\tau_N \in TS({\cal A})$ and $\tau_N$ satisfies the large deviation. The rate function is in close connection with Voiculescu's free entropy defined for pairs of projections., Comment: 22 pages

Published
2005

9. A free analogue of the transportation cost inequality on the circle

Author

Hiai, F. and Petz, D.

Subjects
Mathematics - Operator Algebras, Mathematics - Probability, Primary: 46L54, secondary: 60E15, 94A17, 15A52
Abstract

We give a new proof of the free transportation cost inequality for measures on the circle following M. Ledoux's idea., Comment: 8 pages

Published
2005

10. Equilibrium states and their entropy densities in gauge-invariant C*-systems

Author

Akiho, N., Hiai, F., and Petz, D.

Subjects
Mathematics - Operator Algebras, 46L30, 37D35, 82B10
Abstract

A gauge-invariant C*-system is obtained as the fixed point subalgebra of the infinite tensor product of full matrix algebras under the tensor product unitary action of a compact group. In the paper, thermodynamics is studied on such systems and the chemical potential theory developed by Araki, Haag, Kastler and Takesaki is used. As a generalization of quantum spin system, the equivalence of the KMS condition, the Gibbs condition and the variational principle is shown for translation-invariant states. The entropy density of extremal equilibrium states is also investigated in relation to macroscopic uniformity., Comment: 20 pages, revised in March 2005

Published
2004
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14. Generalized Log-Majorization and Multivariate Trace Inequalities

Author

Hiai, F, König, R, Tomamichel, M, Hiai, F, König, R, and Tomamichel, M

Abstract

© 2017, Springer International Publishing. We show that recent multivariate generalizations of the Araki–Lieb–Thirring inequality and the Golden–Thompson inequality (Sutter et al. in Commun Math Phys, 2016. doi:10.1007/s00220-016-2778-5) for Schatten norms hold more generally for all unitarily invariant norms and certain variations thereof. The main technical contribution is a generalization of the concept of log-majorization which allows us to treat majorization with regard to logarithmic integral averages of vectors of singular values.

Published
2017

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