# Multinomial regression using multinom function in R

I was thinking about posting my question in Cross-Validated, but decided to come here. I am using the multinom() function from the nnet package to estimate the odds of becoming employed, unemployed, or out of labor force conditioned on age and education. I need some help with the interpretation.

I have the following dataset of one dependent categorical variable employment status(EmpSt) and two independent categorical variables: age (Age) and education level (Education).

>head(df)
EmpSt   Age                         Education
1           Employed   61+   Less than a high school diploma
2           Employed 50-60 High school graduates, no college
3 Not in labor force 50-60   Less than a high school diploma
4           Employed 30-39       Bachelor's degree or higher
5           Employed 20-29  Some college or associate degree
6           Employed 20-29  Some college or associate degree


Here is the summary with the levels:

>summary(df)
EmpSt          Age                                    Education
Not in universe   :    0   16-19: 6530   Less than a high school diploma  :14686
Employed          :61478   20-29:16031   High school graduates, no college:30716
Unemployed        : 3940   30-39:16520   Some college or associate degree :28525
Not in labor force:38508   40-49:17403   Bachelor's degree or higher      :29999
50-60:20779
61+  :26663

• First,what is the estimation equation(model)

I want to determine what is the estimation equation(model) for the call

df$EmpSt<-relevel(df$EmpSt,ref="Employed") multinom(EmpSt ~ Age + Education,data=df)

so I can write it down in my research paper. In my understanding the Employed is the base level and the logit model for this call is:

where i and n are the categories of the variables age and education respectively (sorry for confusing notation). Please, correct me if my understanding of the logistic model produced by multinom() is incorrect. I am not going to include the summary of the test because it is a lot of output, so below I just include the the output for call >test:

> test
Call:
multinom(formula = EmpSt ~ Age + Education, data = ml)

Coefficients:
(Intercept)   Age20-29   Age30-39   Age40-49   Age50-60     Age61+
Unemployed           -1.334734 -0.3395987 -0.7104361 -0.8848517 -0.9358338 -0.9319822
Not in labor force    1.180028 -1.2531405 -1.6711616 -1.6579095 -1.2579600  0.8197373
EducationHigh school graduates, no college EducationSome college or associate degree
Unemployed                                         -0.4255369                                 -0.781474
Not in labor force                                 -0.8125016                                 -1.004423
EducationBachelor's degree or higher
Unemployed                                    -1.351119
Not in labor force                            -1.580418

Residual Deviance: 137662.6
AIC: 137698.6


Given that my understanding of the logit model produced by the multinom() is correct the coefficients are the logged odds where the base level is Employed. To get the actual odds I antilog by the call exp(coef(test)) which gives me the actual odds:

> exp(coef(test))
(Intercept)  Age20-29  Age30-39  Age40-49  Age50-60    Age61+
Unemployed           0.2632281 0.7120560 0.4914298 0.4127754 0.3922587 0.3937724
Not in labor force   3.2544655 0.2856064 0.1880285 0.1905369 0.2842333 2.2699035
EducationHigh school graduates, no college EducationSome college or associate degree
Unemployed                                          0.6534189                                 0.4577308
Not in labor force                                  0.4437466                                 0.3662560
EducationBachelor's degree or higher
Unemployed                                    0.2589504
Not in labor force                            0.2058891


which brings me to my next question.

• Second, the probabilities

I wonder if there is a way to get the actual probabilities of being unemployed vs employed based on the combination of age and education,e.g what is the probability of being unemployed if I am 22 and have a high school diploma. Sorry for the lengthy question. Thanks for your help. Let me know if additional clarification is needed.

About your first question, I'm also having some doubts about multinom with categorical variables (here is my question: Multinom with Matrix of Counts as Response).

From what a user replied in that question and the output of >test you posted, I guess that the math you wrote is partially right: indeed, a multinomial model should work only if the predictor variables are continuous or dichotomous (i.e., with values only 0 or 1), and it seems that when multinom gets categorical variables as predictors, like in your example, R automatically converts them to dummy varibales (only 0 or 1).

With reference to your example, considering only the Age predictor, we should have ln(\frac{Pr(unemployed)}{Pr(employed}) = \beta_0 + \beta_1*Age20-29 + \beta_2*Age30-39 + ... and an analogous formula for Pr(not in labor force), but with different \beta coefficients.

About your second question: yes, there is a way. Use predict(test, newdata, "probs"), where newdata is an array with Age20-29 and High school graduates, no college as entries (given your example).

• Thanks for the correction on the math. Overlooked this one. About the probabilities: the predict() is also what I found online. I found an awesome article that goes in detail about the multinom() in R (ats.ucla.edu/stat/r/dae/mlogit.htm). It is worth mentioning the fitted() function described in the link. It takes in the multinom model and outputs probabilities, but I have no idea what kind of probabilities. Anyway, thanks.
– Koba
Commented Mar 10, 2014 at 8:37
• Great link! The fitted function works with the data you used to fit. I made a mistake in my answer regarding the logit function, which is ln(\frac{Pr(unemployed)}{Pr(employed}), hence with respect to the base class Employed (as you correctly wrote in your question). Commented Mar 10, 2014 at 8:54
• Again about the fitted function: for example in the link provided, after head(pp <- fitted(test)), each row corresponds to the row of the predictors of the original data, and each of the three values is the probability to have one of the "prog" categories. From the logit probabilities R computed the separate probabilities Pr(employed), Pr(unemployed) and Pr(out of labor) by using the additional condition that their sum for each row of the predictors is 1 (and the sum of each row in the example is in fact 1). Commented Mar 10, 2014 at 9:00
• Sorry, I made a mess with the notation. In my last comment, the probabilities are those of the linked example, hence Pr(academic), Pr(general) and Pr(vocation). Commented Mar 10, 2014 at 9:27