论文信息 - Operator-valued Semicircular Elements: Solving A Quadratic Matrix Equation with Positivity Constraints

Operator-valued Semicircular Elements: Solving A Quadratic Matrix Equation with Positivity Constraints

We show that the quadratic matrix equation $VW + \eta (W)W = I$, for given $V$ with positive real part and given analytic mapping $\eta$ with some positivity preserving properties, has exactly one solution $W$ with positive real part. We point out the relevance of this result in the context of operator-valued free probability theory and for the determination of the asymptotic eigenvalue distribution of band or block random matrices. We also address the problem of a numerical determination of the solution.

J. William Helton | Roland Speicher | Reza Rashidi Far

[1] J. Helton,et al. Extremal Problems of Interpolation Theory , 2005 .

[2] Richard S. Hamilton,et al. A xed point theorem for holomorphic mappings , 1970 .

[3] Roland Speicher,et al. Combinatorial Theory of the Free Product With Amalgamation and Operator-Valued Free Probability Theory , 1998 .

[4] Lawrence A. Harris,et al. Fixed points of holomorphic mappings for domains in Banach spaces , 2003 .

[5] André C. M. Ran,et al. On the nonlinear matrix equation X+A∗F(X)A=Q: solutions and perturbation theory , 2002 .

[6] Roland Speicher,et al. IT ] 9 O ct 2 00 6 Spectra of large block matrices R . Rashidi , 2008 .

[7] L. Pastur. On the spectrum of random matrices , 1972 .

[8] Uffe Haagerup,et al. A new application of random matrices: Ext(C^*_{red}(F_2)) is not a group , 2002 .

[9] D. Shlyakhtenko. Random Gaussian band matrices and freeness with amalgamation , 1996 .

[10] Alexandru Nica,et al. Lectures on the Combinatorics of Free Probability , 2006 .

[11] Steven G. Krantz. The Carathéodory and Kobayashi Metrics and Applications in Complex Analysis , 2008, Am. Math. Mon..