The Levenberg–Marquardt algorithm is a flexible iterative procedure used to solve non-linear least-squares problems. In this work, we study how a class of possible adaptations of this procedure can be used to solve maximum-likelihood problems when the underlying distributions are in the exponential family. We formally demonstrate a local convergence property and discuss a possible implementation of the penalization involved in this class of algorithms. Applications to real and simulated compositional data show the stability and efficiency of this approach
Giordan, M.; Vaggi, F.; Wehrens, H.R.M.J. (2017). On the maximization of likelihoods belonging to the exponential family using a Levenberg–Marquardt approach. JOURNAL OF STATISTICAL COMPUTATION AND SIMULATION, 87 (5): 895-907. doi: 10.1080/00949655.2016.1238086 handle: http://hdl.handle.net/10449/38016
On the maximization of likelihoods belonging to the exponential family using a Levenberg–Marquardt approach
Giordan, Marco
Primo
;Vaggi, Federico;Wehrens, Herman Ronald Maria JohanUltimo
2017-01-01
Abstract
The Levenberg–Marquardt algorithm is a flexible iterative procedure used to solve non-linear least-squares problems. In this work, we study how a class of possible adaptations of this procedure can be used to solve maximum-likelihood problems when the underlying distributions are in the exponential family. We formally demonstrate a local convergence property and discuss a possible implementation of the penalization involved in this class of algorithms. Applications to real and simulated compositional data show the stability and efficiency of this approach
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