Publications in Scientific Journals:
E. Bura, S. Duarte, L. Forzani, E. Smucler, M. Sued:
"Asymptotic theory for maximum likelihood estimates in reduced-rank multivariate generalized linear models";
STATISTICS,
52
(2018),
5;
1005
- 1024.
English abstract:
Reduced-rank regression is a dimensionality reduction method with many applications. The asymptotic theory for reduced rank estimators of parameter matrices in multivariate linear models has been studied extensively. In contrast, few theoretical results are available for reduced-rank multivariate generalized linear models. We develop M-estimation theory for concave criterion functions that are maximized over parameter spaces that are neither convex nor closed. These results are used to derive the consistency and asymptotic distribution of maximum likelihood estimators in reduced-rank multivariate generalized linear models, when the response and predictor vectors have a joint distribution. We illustrate our results in a real data classification problem with binary covariates.
Keywords:
M-estimation, exponential family, rank restriction, non-convex, parameter spaces
"Official" electronic version of the publication (accessed through its Digital Object Identifier - DOI)
http://dx.doi.org/10.1080/02331888.2018.1467420
Electronic version of the publication:
https://publik.tuwien.ac.at/files/publik_276915.pdf
Created from the Publication Database of the Vienna University of Technology.