https://docs.google.com/spreadsheets/d/1AghQEBByaXAi0YeOJOMFmATJMtEBJXx_O7i
BLXMbq_I/edit?usp=sharing


http://www.fields.utoronto.ca/activities/20-21/constraint-distance

replied:
Charlie Johnson not 100%
Hugo W.
-----------------------------------
Classical and Multivariable Toeplitz Matrices: Completions and Other
Aspects.

Hugo J. Woerdeman, Drexel University

Toeplitz matrices appear as covariance matrices of stationary random
processes. In the univariate case this leads to classical Toeplitz
matrices, while in the multivariate case one obtains matrices that
exhibit Toeplitz structures at different levels. Identification problems
for stationary processes lead to completion problems for these classes
of structured matrices. Their solutions often involve the
Gohberg-Semencul formula for the inverse of a classical Toeplitz matrix,
as well as its multivariable generalizations. In this talk we report on
several developments from the last few years, as well as outline some
open problems. The results are based on joint works with a variety of
co-authors, which include Jeffrey Geronimo, Selcuk Koyuncu, Stefan
Sremac, Henry Wolkowicz and Chung Wong.   
-----------------------------------
Fei Wang
Liberti 
Lavor
--
 Claudia, Jon and Zhongzhu  replied  NO

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Lieven?

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attending Stefan S.
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New people?
  "Tarazaga, Pablo" <Pablo.Tarazaga@tamucc.edu>
 Jon Dattorro <dattorro@stanford.edu>

Michael Trosset mtrosset@indiana.edu
    http://pages.iu.edu/~mtrosset/