Editing Linear discriminant analysis (section)

==Assumptions==
The assumptions of discriminant analysis are the same as those for MANOVA. The analysis is quite sensitive to outliers and the size of the smallest group must be larger than the number of predictor variables.<ref name="buy"/>

*[[Multivariate normal distribution|Multivariate normality]]: Independent variables are normal for each level of the grouping variable.<ref name="green"/><ref name="buy"/>
*Homogeneity of variance/covariance ([[homoscedasticity]]): Variances among group variables are the same across levels of predictors. Can be tested with [[Box's M test|Box's M]] statistic.<ref name="green"/> It has been suggested, however, that linear discriminant analysis be used when covariances are equal, and that [[quadratic classifier#Quadratic discriminant analysis|quadratic discriminant analysis]] may be used when covariances are not equal.<ref name="buy"/>
*[[statistical independence|Independence]]: Participants are assumed to be randomly sampled, and a participant's score on one variable is assumed to be independent of scores on that variable for all other participants.<ref name="green"/><ref name="buy"/>

It has been suggested that discriminant analysis is relatively robust to slight violations of these assumptions,<ref>Lachenbruch, P. A. (1975). ''Discriminant analysis''. NY: Hafner</ref> and it has also been shown that discriminant analysis may still be reliable when using dichotomous variables (where multivariate normality is often violated).<ref>Klecka, William R. (1980). ''Discriminant analysis''. Quantitative Applications in the Social Sciences Series, No. 19. Thousand Oaks, CA: Sage Publications.</ref>