# Equivalent R^2 for Logit Regression in Stata

I am running Logit Regression in Stata.

1. How can I know the explanatory power of the regression (in OLS, I look at R^2)?

2. Is there a meaningful approach in expanding the regression with other independent variables (in OLS, I manually keep on adding the independent variables and look for adjusted R^2; my guess is Stata should have simplified this manual process)?

-

I'm worried that you are getting the fundamentals of modelling wrong here:

1. The explanatory power of a regression model is theoretically determined by your interpretation of the coefficients, not by the R-squared. The R^2 represents the amount of variance that your linear model predicts, which might be an appropriate benchmark to your model, or not.

2. Identically, the presence or absence of an independent variable in your model requires substantive justification. If you want to have a look at how the R-squared changes when adding or subtracting parts of your model, see `help nestreg` for help on nested regression.

To summarize: the explanatory power of your model and its variable composition cannot be determined just by crunching the numbers. You first need an adequate theory to build your model onto.

Now, if you are running `logit`:

• Read Long and Freese (Ch. 3) to understand how log likelihood converges (or not) in your model.
• Do not expect to find something as straightforward as the R-squared for `logit`.
• Use logit diagnostics on your model, just like you should be after running OLS.

You might also want to read the likelihood ratio Chi-squared test or run additional `lrtest` commands as explained by Eric.

-
Nice answer, I would also suggest perusing the answers to this question on CV related to interpreting pseudo R square statistics for logistic regression. –  Andy W Sep 30 '12 at 14:06

The concept of R^2 is meaningless in logit regression and you should disregard the McFadden Pseudo R2 in the Stata output altogether. Lemeshow recommends 'to assess the significance of an independent variable we compare the value of D with and without the independent variable in the equation' with the Likelihood ratio test (G): G=D(Model without variables [B])-D(Model with variables [A]).

The Likelihood ratio test (G):

H0: coefficients for eliminated variables are all equal to 0

Ha: at least one coefficient is not equal to 0

When the LR-test p>.05 do not reject H0, which implies that, statistically speaking, there is no advantage to include the additional IV's into the model.

Example Stata syntax to do this is: logit DV IV1 IV2 estimates store A logit DV IV1 estimates store B lrtest A B // i.e. tests if A is 'nested' in B

Note, however, that many more aspects have to checked and tested before we can conclude whether or not a logit model is 'acceptable'. For more detauls, I recommend to visit: http://www.ats.ucla.edu/stat/stata/topics/logistic_regression.html

and consult:

Applied logistic regression, David W. Hosmer and Stanley Lemeshow , ISBN-13: 978-0471356325

-
``````lroc