Title of article
Matrix power means and the Karcher mean
Author/Authors
Yongdo Lim، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2012
Pages
17
From page
1498
To page
1514
Abstract
We define a new family of matrix means {Pt (ω;A)}t∈[−1,1], where ω and A vary over all positive probability
vectors in Rn and n-tuples of positive definite matrices resp. Each of these means except t = 0
arises as a unique positive definite solution of a non-linear matrix equation, satisfies all desirable properties
of power means of positive real numbers and interpolates between the weighted harmonic and arithmetic
means. The main result is that the Karcher mean coincides with the limit of power means as t →0. This
provides not only a sequence of matrix means converging to the Karcher mean, but also a simple proof
of the monotonicity of the Karcher mean, conjectured by Bhatia and Holbrook, and other new properties,
which have recently been established by Lawson and Lim and also Bhatia and Karandikar using probabilistic
methods on the metric structure of positive definite matrices equipped with the trace metric.
© 2011 Elsevier Inc. All rights reserved
Keywords
Thompson metric , Power mean , Riemannian barycenter , Positive definite matrix , geometric mean , monotonicity , Riemannian trace metric , Metric nonpositivecurvature
Journal title
Journal of Functional Analysis
Serial Year
2012
Journal title
Journal of Functional Analysis
Record number
840649
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