When non-linear models are fitted to experimental data, parameter estimates can be poorly constrained albeit being identifiable in principle. This means that along certain paths in parameter space, the log-likelihood does not exceed a given statistical threshold but remains bounded. This situation, denoted as practical non-identifiability, can be detected by Monte Carlo sampling or by systematic scanning using the profile likelihood method. In contrast, any method based on a Taylor expansion of the log-likelihood around the optimum, e.g., parameter uncertainty estimation by the Fisher Information Matrix, reveals no information about the boundedness at all. In this work, we present a geometric approach, approximating the original log-likelih...
Using the mathematical framework of information geometry, we introduce a novel method which allows o...
Parameter estimation in nonlinear models is a common task, and one for which there is no general sol...
High dimensional data that lies on or near a low dimensional manifold can be described by a collecti...
Many nonlinear parameter estimation problems can be described by the class of curved exponential fam...
(A) Typically, model parameters, are considered functions of the log-likelihood, ℓ(p), a one-dimens...
Information geometry enables a deeper understanding of the methods of statistical inference. In this...
Information geometry enables a deeper understanding of the methods of statistical inference. In this...
In this work, we: (i) review likelihood-based inference for parameter estimation and the constructio...
When data in higher dimensions with a certain constraint on it, say a set of locations on a sphere, ...
Scientists use mathematical modelling as a tool for understanding and predicting the properties of c...
Scientists use mathematical modelling to understand and predict the properties of complex physical s...
Parameter estimation is a vital component of model development. Making use of data, one aims to dete...
The problem of updating a structural model and its associated uncertainties by utilizing structural ...
Subspace estimation appears in a wide variety of signal processing applications such as radar, commu...
In this article, we combine results from the theory of linear exponential families, polyhedral geome...
Using the mathematical framework of information geometry, we introduce a novel method which allows o...
Parameter estimation in nonlinear models is a common task, and one for which there is no general sol...
High dimensional data that lies on or near a low dimensional manifold can be described by a collecti...
Many nonlinear parameter estimation problems can be described by the class of curved exponential fam...
(A) Typically, model parameters, are considered functions of the log-likelihood, ℓ(p), a one-dimens...
Information geometry enables a deeper understanding of the methods of statistical inference. In this...
Information geometry enables a deeper understanding of the methods of statistical inference. In this...
In this work, we: (i) review likelihood-based inference for parameter estimation and the constructio...
When data in higher dimensions with a certain constraint on it, say a set of locations on a sphere, ...
Scientists use mathematical modelling as a tool for understanding and predicting the properties of c...
Scientists use mathematical modelling to understand and predict the properties of complex physical s...
Parameter estimation is a vital component of model development. Making use of data, one aims to dete...
The problem of updating a structural model and its associated uncertainties by utilizing structural ...
Subspace estimation appears in a wide variety of signal processing applications such as radar, commu...
In this article, we combine results from the theory of linear exponential families, polyhedral geome...
Using the mathematical framework of information geometry, we introduce a novel method which allows o...
Parameter estimation in nonlinear models is a common task, and one for which there is no general sol...
High dimensional data that lies on or near a low dimensional manifold can be described by a collecti...