Results 261 to 270 of about 70,549 (302)
Some of the next articles are maybe not open access.
Related searches:
Related searches:
Technometrics, 1992
Generalized Additive Models. By T. J. Hastie and R. J. Tibshirani. ISBN 0 412 34390. Chapman and Hall, London, 1990. 336 pp. £25.00.
Richard D. de Veaux +2 more
+4 more sources
Generalized Additive Models. By T. J. Hastie and R. J. Tibshirani. ISBN 0 412 34390. Chapman and Hall, London, 1990. 336 pp. £25.00.
Richard D. de Veaux +2 more
+4 more sources
2004
In Chapter 8 we discussed additive models (AM) of the form $$ E(Y|X) = c + \sum\limits_{\alpha = 1}^d {g_\alpha (x_\alpha )} . $$ (1) Note that we put EY = c and E(g α (X α ) = 0 for identification.
Wolfgang Härdle +3 more
openaire +2 more sources
In Chapter 8 we discussed additive models (AM) of the form $$ E(Y|X) = c + \sum\limits_{\alpha = 1}^d {g_\alpha (x_\alpha )} . $$ (1) Note that we put EY = c and E(g α (X α ) = 0 for identification.
Wolfgang Härdle +3 more
openaire +2 more sources
2010
This chapter returns to the problem of modelling the effect of continuous variables like age or engine power. Introducing the concept of penalized deviances leads to the use of cubic splines, a well-known tool in numerical analysis. Representing cubic splines in terms of so called B-splines makes it possible to formulate an estimation problem in terms ...
Esbjörn Ohlsson, Björn Johansson
openaire +1 more source
This chapter returns to the problem of modelling the effect of continuous variables like age or engine power. Introducing the concept of penalized deviances leads to the use of cubic splines, a well-known tool in numerical analysis. Representing cubic splines in terms of so called B-splines makes it possible to formulate an estimation problem in terms ...
Esbjörn Ohlsson, Björn Johansson
openaire +1 more source
Sparse Additive Generative Models of Text [PDF]
Generative models of text typically associate a multinomial with every class label or topic. Even in simple models this requires the estimation of thousands of parameters; in multifaceted latent variable models, standard approaches require additional latent ``switching'' variables for every token, complicating inference.
Jacob Eisenstein +2 more
openaire +1 more source
2016
This chapter formulates and demonstrates generalized additive models (GAMs) for means of continuous outcomes treated as independent and normally distributed with constant variances as in linear regression and for logits (log odds) of means of dichotomous discrete outcomes with unit dispersions as in logistic regression.
George J. Knafl, Kai Ding
openaire +1 more source
This chapter formulates and demonstrates generalized additive models (GAMs) for means of continuous outcomes treated as independent and normally distributed with constant variances as in linear regression and for logits (log odds) of means of dichotomous discrete outcomes with unit dispersions as in logistic regression.
George J. Knafl, Kai Ding
openaire +1 more source
2001
The multiple linear regression model discussed in Chapter 8 and the generalized linear model covered in Chapters 9 and 10 accommodate nonlinear relationships between the response variable (or the link function of its mean) and one or more of the explanatory variables by using polynomial terms or parametric transformations. (The predictor remains linear
Brian Everitt, Sophia Rabe-Hesketh
openaire +1 more source
The multiple linear regression model discussed in Chapter 8 and the generalized linear model covered in Chapters 9 and 10 accommodate nonlinear relationships between the response variable (or the link function of its mean) and one or more of the explanatory variables by using polynomial terms or parametric transformations. (The predictor remains linear
Brian Everitt, Sophia Rabe-Hesketh
openaire +1 more source
Feature significance in generalized additive models
Statistics and Computing, 2007This paper develops inference for the significance of features such as peaks and valleys observed in additive modeling through an extension of the SiZer-type methodology of Chaudhuri and Marron (1999) and Godtliebsen et al. (2002, 2004) to the case where the outcome is discrete.
B. Ganguli, Matt P. Wand
openaire +1 more source
On A General Fuzzy Additive Clustering Model
Intelligent Automation & Soft Computing, 1995ABSTRACTThe purpose of this article is to define a generalized structural model of similarity between a pair of objects. Applying a classification of a given data set as a structural model, we have developed an additive fuzzy clustering model.7,8 The essential merits of the additive fuzzy clustering models are 1) the amount of computations for the ...
Mika Sato, Yoshiharu Sato
openaire +1 more source
Generalized additive models for functional data
TEST, 2011zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Febrero-Bande, Manuel +1 more
openaire +1 more source

