Solved: Logistic Regression -- Understanding Maximum Likelihood

NKormanik · Posted 03-13-2022 09:03 PM

Please see the following quote:

When Maximum Likelihood Exp(Est) is less than 1, increasing values of the variable correspond to decreasing odds of the event's occurrence.

Q1: Just want to make sure.... So, decreasing values of the variable correspond to increasing odds of the event's occurrence.

Q2: Additionally, the further from 1 the variable is (on either side), the greater the effect.

Example:

X1 MLE(Est) = 0.7

X2 MLE(Est) = 0.4

X2 will have a substantially greater effect on the odds of event's occurrence.

Thoughts appreciated.

Nicholas Kormanik

(p.s. -- If you feel there is a more appropriate forum for this question, please let me know.)

pink_poodle · Posted 03-13-2022 11:04 PM

Assuming a linear relationship between x and outcome, it does not matter where x value is. Yes, decreasing x would associate with increased odds of outcome.

View solution in original post

pink_poodle · Posted 03-13-2022 09:11 PM

It may be easier to think about it in percents. One unit increase in X1 associates with 30% decrease in the odds of the event. One unit increase in X2 associates with 60% decrease in the odds of the event. Therefore, you are correct, X2 associates with a greater negative effect on the odds of the event’s occurence.

NKormanik · Posted 03-13-2022 09:37 PM

@pink_poodle

Super. But the specific question I'm requesting confirmation of in Q1 is:

True or false: If MLE(Est) < 1, decreasing the values of that variable correspond to increasing odds of the event's occurrence.

NKormanik · Posted 03-13-2022 09:57 PM

A bit more clarification:

In the above example, let's look at X2 values.

X2 in our dataset ranges from 0 to 100. Assume a fairly normal distribution.

Does it not matter where in the distribution the X2 value is?

I.e., X2 = 70 vs. X2 = 30.

If X2 MLE(Est) = 0.4, decreasing X2 in either of the above will amount to an increase in the odds of the event in question.

Please enlighten with your wisdom.

pink_poodle · Posted 03-13-2022 11:04 PM

Assuming a linear relationship between x and outcome, it does not matter where x value is. Yes, decreasing x would associate with increased odds of outcome.

Ksharp · Posted 03-14-2022 07:45 AM

"True or false: If MLE(Est) < 1, decreasing the values of that variable correspond to increasing odds of the event's occurrence."
It is true I think. @Rick_SAS has wrote many bolgs about proc logistic . If you read his blog you would know the answer.

Basically, Yx+1 - Yx = beta(x+1 - x) => beta . Here Yx+1 - Yx = LOG( Px+1/(1-Px+1) ) - LOG( Px/(1-Px) ) = LOG( ODDS ).
Therefore ,Exp(Est)=Exp(beta)=Exp( LOG( ODDS ) ) = ODDS . if ODDS>1 they have the same direction, whereas vice verse .

Rick_SAS · Posted 03-14-2022 08:39 AM

In spite of the title and the notation in the OP's question, I don't this question is related to maximum likelihood estimations. It is merely a statement about interpreting the parameter estimate for a linear logistic model. How that estimate was obtained is irrelevant.

NKormanik · Posted 03-14-2022 07:30 PM

@Rick_SAS @Ksharp @pink_poodle

Correct! Doing a Google and Google Scholar search to answer the question brings up LOADS of the math.

NKormanik · Posted 03-16-2022 10:28 PM

@Rick_SAS @Ksharp @pink_poodle

Thanks all. Rick's article was helpful in pointing to a far better perspective viewing odds ratio:

plots=oddsratio(logbase=2 order=descending)

Wow! What a difference!

Logistic Regression -- Understanding Maximum Likelihood

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