In probability theory, the multinomial distribution generalizes the binomial distribution to three or more outcomes.
Suppose two chess players had played numerous games, from which we estimate that Player A would win with probability 0.40, Player B would win with probability 0.35, and the probability that the game ends in a draw is 0.25. The multinomial distribution can be used to answer questions like:
- If these two chess players played 12 games, what is the expected number of wins, losses, and draws for player A?
- If these two chess players play 3 games, what is the probability that A wins one, B, wins one, and they draw on the other?
Binary classification/prediction methods (such as logistic regression) can also be generalized for multinomial outcomes (i.e., three or more class labels). Multinomial logistic regression is also sometimes called a maximum entropy (MaxEnt) model.