Training Error -- what's the point?

Question

What's the overall point of training error in the goal of regression (i.e, making predictions)?

You might say something like, "well, you see, training error can help you determine which model of complexity is the best to use. "

And to that, some would say, "No you can't. Low training error could just mean that your model is conforming to whatever data you're training the model with, A.K.A overfitting"

What's the point of calculating training error if it's not a good predictive measure of performance?

Especially when we go through and say, to hell with training error, just use validation error..

When will we ever use training error?

Low training error can be indicative of overfitting.. is that the only use of it?

Answer 1

Training error by itself can be a very bad metric of your model performance, as you have correctly pointed out. However, there is no going around the fact that you need to train your model to make some meaningful predictions.

That is why you need training, validation and the test phases and data sets. The overfitting that can easily happen in the training dataset can be alleviated to some extent by using the randomly sub-sampled validation dataset because if you have overfitted, your model will not generalize (you should see that your training error does down monotonically as the model complexity increases but your validation error plateaus at some point and additional model complexity actually increases the validation error). However, if you do not do any training of the model, you do not have a model to validate!

The model needs to be trained. There is no getting around that. However, training error by itself is useless. One needs to perform cross-validation in order to ensure that the model is generalizable. The bottom line is that anything you use which the model has seen to during the training phase to evaluate it's performance is invalid. It is useful for model fitting but not for evaluation. The correct way to do so is cross-validation regardless of what the OP claims in the discussion below.

You should look into the concept of bias-variance tradeoff as this has a direct bearing on your question and should clarify your doubt.