![]() XLSTAT makes it possible to use two alternative models to calculate the probabilities of assignment to the categories given the explanatory variables: the logit model and the probit model. Binomial logistic regression is a special case of ordinal logistic regression, corresponding to the case where J=2. The principle of ordinal logistic regression is to explain or predict a variable that can take J ordered alternative values (only the order matters, not the differences), as a function of a linear combination of the explanatory variables. XLSTAT uses the Newton-Raphson algorithm to iteratively find a solution. The model proposed by XLSTAT to relate the probability of occurrence of an event to the explanatory variables is the logit model which is one of the four models proposed for the binomial case.Ĭontrary to linear regression, an exact analytical solution does not exist. For ease of writing, the equations below are written considering the first category as the reference category. The estimated coefficients will be interpreted according to this control category. Ideally, we will choose what corresponds to the "basic" or "classic" or "normal" situation. Within the framework of the multinomial model, a control category must be selected. The binomial case seen previously is therefore a special case where J=2. The principle of multinomial logistic regression is to explain or predict a variable that can take J alternative values (the J categories of the variable), as a function of explanatory variables. ![]() Being iterative, however, it can slow down the calculations. This method is more reliable as it does not require the assumption that the parameters are normally distributed. XLSTAT also offers the alternative " Likelihood ratio" method (Venzon and Moolgavkar, 1988). In most software, the calculation of confidence intervals for the model parameters is as for linear regression assuming that the parameters are normally distributed. Both these functions are perfectly symmetric and sigmoid: XLSTAT provides two other functions: the complementary Log-log function which is closer to the upper asymptote, and the Gompertz function which, on the contrary, is closer the axis of abscissa. The most common functions used to link probability p to the explanatory variables are the logistic function (we refer to the Logit model) and the standard normal distribution function (the Probit model). ![]() The probability parameter p is here a function of a linear combination of explanatory variables. For logistic regression, the dependent variable, also called the response variable, follows a Bernoulli distribution of parameter p (p is the mean probability that an event will occur) when the experiment is repeated once, or a Binomial(n,p) distribution if the experiment is repeated nn times (for example the same dose given to nn patients). Logistic and linear regression belong to the same family of models called GLM ( Generalized Linear Model): in both cases, an event is linked to a linear combination of explanatory variables.įor linear regression, the dependent variable follows a normal distribution N(μ,σ) where μ is a linear function of the explanatory variables. Models for logistic regression Binomial logistic regression For example, in the medical field, we seek to assess from what dose of a drug, a patient will be cured. The principle of the logistic regression model is to explain the occurrence or not of an event (the dependent variable noted Y) by the level of explanatory variables (noted X). It is widely used in the medical field, in sociology, in epidemiology, in quantitative marketing (purchase or not of products or services following an action) and in finance for risk modeling (scoring). Logistic regression is a frequently used method because it allows to model binomial (typically binary) variables, multinomial variables (qualitative variables with more than two categories) or ordinal (qualitative variables whose categories can be ordered). Definition of the logistic regression in XLSTAT Principle of the logistic regression ![]()
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