Talk from Archives

New results about Correlation Matrices

10.11.2021 16:45 - 17:45

 

We obtain a canonical representation for block matrices. The representation facilitates simple computation of the determinant, the matrix inverse, and other powers of a block matrix, as well as the matrix logarithm and the matrix exponential. These results are particularly useful for block covariance and block correlation matrices, where evaluation of the Gaussian log-likelihood and estimation are greatly simplified. We illustrate this with an empirical application using a large panel of daily asset returns. Moreover, the representation paves new ways to regularizing large covariance/correlation matrices and to test block structures in matrices.

Talk based on the following preprint: arxiv.org/abs/2012.02698

Personal Website of Peter R. Hansen

 

The talk also can be joined online via our ZOOM MEETING

Meeting room opens at: November 10, 2021 4.30 pm Vienna

Meeting ID: 923 5578 3757

Password: 383975

Location:
HS 12 OMP1 (#2.505)