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Update Generalized Linear Models authored by Mortaheb Sepehr's avatar Mortaheb Sepehr
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Generalized-Linear-Models.md
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......@@ -142,6 +142,28 @@ In this linear predictor, we can also use transformation of the predictors as we
onto the linear predictor. This function should be chosen in such a way to ensure that
the predicted means are in the permissible range.
<img src="https://latex.codecogs.com/svg.latex?g(\mu)=\eta" title="g(\mu)=\eta" />
This link function should be monotonic and differentiable. As a result, the mean of the
response variable would be linked to the predictor variables as:
<img src="https://latex.codecogs.com/svg.latex?\mu&space;=&space;g^{-1}(\eta)=g^{-1}(\beta_0&plus;\beta_1x_1&plus;...&plus;\beta_Qx_Q)" title="\mu = g^{-1}(\eta)=g^{-1}(\beta_0+\beta_1x_1+...+\beta_Qx_Q)" />
The important thing here is that this link relates the mean of the response to the
linear predictor and this is different from transforming the response variable.
An important consideration in choosing a link function is whether the selected link
will yield predicted values that are permissible. As an example, a common link for non-
negative count data or reaction times would be the natural logarithm. When the data are
not bounded, an identical function or a reciprocal function can be used. For the data
that are bounded between 0 and 1 a cumulative distribution function can be chosen (such
as logistic (logit function), normal (probit function), or Gumbal (log-log function)
distributions).
For the distributions of the natural exponential family, special link functions exist which are called *Canonical Link Functions*. By using the canonical link functions, we assure that the natural parameter of the distribution <img src="https://latex.codecogs.com/svg.latex?\theta" title="\theta" /> equals the linear predictor <img src="https://latex.codecogs.com/svg.latex?\eta" title="\eta" />. These functions are a good initial choice to start our modeling procedure but in some cases they may not be the best option.
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