2013
DOI: 10.1371/journal.pone.0061623
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Boosted Beta Regression

Abstract: Regression analysis with a bounded outcome is a common problem in applied statistics. Typical examples include regression models for percentage outcomes and the analysis of ratings that are measured on a bounded scale. In this paper, we consider beta regression, which is a generalization of logit models to situations where the response is continuous on the interval (0,1). Consequently, beta regression is a convenient tool for analyzing percentage responses. The classical approach to fit a beta regression model… Show more

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Cited by 59 publications
(55 citation statements)
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“…As sex‐specific topologies are tested independently, scaling was achieved using the maximum norm, consisting in dividing centrality scores by the maximum score of the centrality vector (Ruhnau, ). Fitting ordinary least‐squares regression to bounded and skewed response variable shows, however, the risk of violation of the linearity, normality and homoscedasticity assumptions (Cribari‐Neto & Zeileis, ; Schmid et al., ). Although transformation of the response distribution (e.g., logit or arcsine functions) is commonly used for complying with model assumptions, the resulting estimates might have biased predictive capacity and may be difficult to interpret (Cribari‐Neto & Zeileis, ; Warton & Hui, ).…”
Section: Methodsmentioning
confidence: 99%
See 1 more Smart Citation
“…As sex‐specific topologies are tested independently, scaling was achieved using the maximum norm, consisting in dividing centrality scores by the maximum score of the centrality vector (Ruhnau, ). Fitting ordinary least‐squares regression to bounded and skewed response variable shows, however, the risk of violation of the linearity, normality and homoscedasticity assumptions (Cribari‐Neto & Zeileis, ; Schmid et al., ). Although transformation of the response distribution (e.g., logit or arcsine functions) is commonly used for complying with model assumptions, the resulting estimates might have biased predictive capacity and may be difficult to interpret (Cribari‐Neto & Zeileis, ; Warton & Hui, ).…”
Section: Methodsmentioning
confidence: 99%
“…Considering the intrinsic nature of the response variable distributions, we conducted beta regressions with the Betareg package (Cribari‐Neto & Zeileis, ) to investigate the relationship between node centrality of each sex‐specific graph (i.e., dependent variable) over the proportion of immigrants and the snow depth (i.e., independent variables). Because the model assumes that values of the response variable ( y ) lie strictly on the unit interval (0 < y < 1), we fitted limit boundaries of y by ( y ·( n − 1) + 0.5)/ n , where n corresponds to the sample size (Schmid et al., ). We also controlled for potential random variation in sampling intensities by adding the number of individual males and females sampled within each node as regressor of their respective sex‐specific model.…”
Section: Methodsmentioning
confidence: 99%
“…The parametrization of the negative binomial distribution, the log-logistic distribution and the t distribution in boosted GAMLSS models is given in Mayr et al (2012a). The derivation of boosted beta regression, another special case of GAMLSS, can be found in Schmid, Wickler, Maloney, Mitchell, Fenske, and Mayr (2013). In our case study we will use the default GaussianLSS() family to model childhood malnutrition in India.…”
Section: Distributionsmentioning
confidence: 99%
“…Another class of GLM that can model proportions or probabilities directly is beta regression (Ferrari & Cribari‐Neto, ). This approach is less commonly employed in ecology, although methods such as boosted beta regression are gaining popularity in the field (Schmid et al, ).…”
Section: Sdmsmentioning
confidence: 99%