I am using keras to train a 5 layer regression model to predict 1000 different thermometers. I train a model and then ask it to predict what the reading will be based on 20 other instruments. I wanted to see if I am doing things correctly, so I trained 10 different models on the same data and with the same parameters and got 10 different model files. I then asked each of the 10 model files to predict a bunch of temperatures. For some of the thermometers, the temperature predictions were pretty consistent across the models, while for others the temperature predictions were all over the place. Here is an example of what I mean:

        | predicted_temp_for_sensor_1 | predicted_temp_for_sensor_2 |
model_0 |                        99.1 |                        78.1 |
model_1 |                        97.2 |                        85.5 |
model_2 |                        96.1 |                       110.7 |
model_3 |                        95.3 |                        80.8 |
model_4 |                        96.4 |                        90.8 |
model_5 |                        97.8 |                        95.7 |
model_6 |                        98.6 |                        92.5 |
model_7 |                        97.9 |                        87.1 |
model_8 |                        99.4 |                        98.8 |
model_9 |                        96.1 |                        85.6 |

To make it more obvious, here as some summary stats for the two sensors:

             | predicted_temp_for_sensor_1 | predicted_temp_for_sensor_2 |
 predictions |                          10 |                          10 |  
        mean |                        97.4 |                        90.6 | 
standard dev |                         1.3 |                         9.0 | 
         min |                        95.3 |                        78.1 |
         max |                        99.4 |                       110.7 |

What can this mean? Is this a sign of model uncertainty? Should I interpret this as low confidence in the predictions? I have no idea what to think about this.

  • $\begingroup$ you only have ten samples in your training data? $\endgroup$ Commented Jun 14, 2017 at 15:11
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    $\begingroup$ I have about 100,000 samples in my training data. I use those 100,000 samples to train 10 separate models, which I then asked to predict the same things and see how those predictions compare to each other. $\endgroup$ Commented Jun 14, 2017 at 15:12
  • $\begingroup$ oh, ok that makes sense now $\endgroup$ Commented Jun 14, 2017 at 15:13
  • $\begingroup$ so what you've done is cross validation; basically retraining the same model with a different subset of data. This is a good technique to measure the general accuracy of a model. what's the mean/stddev R^2 of your ten models? $\endgroup$ Commented Jun 14, 2017 at 15:14
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    $\begingroup$ I used the exact same data for each model, so the only difference would have been the initial weights in all the features which might contribute to different models. $\endgroup$ Commented Jun 14, 2017 at 15:25

2 Answers 2


This is normal and exactly what you should expect. Often, deep models are exquisitely sensitive to the initial parameters. It would appear that they are exquisitely sensitive to the first step taken, even. This is because the loss function is non-convex and optimization procedures have difficulty finding any kind of global minimum--the existence and locatability-by-an-optimization-algorithm of which would make your models the same every time. This is therefore not necessarily an indication of uncertainty in your model.

What to do? (1) You might as well try 10 different random initializations or train it 10 different times with the same initialization and take the one that gives you best results. (Generally when DL is applied, it seems that practitioners are measuring Performace on massive held out sets--CV isn't even feasible.) (2) Read Chapter 8 of Deep Learning by Goodfellow et al. before returning to the answers to this post. It is very interesting and might give insight into what you're seeing.

Here is a revealing diagram shown there.

enter image description here

Devising an optimization procedure that will arrive at the same solution in high dimensions regardless of where it begins is an area of active research, compounded by the difficulties shown just above; besides trying to navigate a nonconvex topology, things like the amount of training iterations might now dictate where you land depending on where you start.

Even if you weren't initializing differently each time, you still could find very different models. You may not even be ending up at different local minimima; in high dimensions, you could land at a saddle point, or plateau, etc, etc. Sometimes, à modeler stop training because the training error plateaus but the norm of the gradient continues to increase, suggesting that it hasn't even reached a critical point!

Ultimately, training deep models can take months for these reasons and appears to be part art. If you're looking for a model that trains the same way every time, consider one of the myriad models with convex losses (e.g., SVM, LR).

Perhaps you don't have enough data to train a very deep model...perhaps with enough data the training would be more stable..but I don't think this is necessarily the case.


Assuming that your classifier is trained well and not over- or underfit, this can usually be taken as a measure of uncertainty: for some reason, different models using the same training data get different results.

This could be possibly because you simply cannot predict this temperature well from the data, e.g. there is no clear correlation available.

Another reason could be train/test data differences. It is a common problem that the training data differ from the test data (e.g. when training on simulation but predicting real events). Highly varying predictions can indicate that (at least the varying feature) is badly represented in the training sample.

What I would propose you to do:

  • Split your training sample, say 80'000 to 20'000, then train your ten models on the former sample and test them on the latter sample. If the variation reduces, it is because of the second reason stated above.
  • Go over your data from an experts point of view: are there variables which probably are more/less correlated?
  • Don't forget about the order of magnitude! If your left temperature has a std of 1 and the one on the right of 10, this could also be because the temperatures in the data of the left vary in a much narrower field. As an example, compare the prediction of the earth surface temperature vs the temperature at the surface of the sun. Of course the prediction about the sun is, absolutely compared, much more off then your prediction about the earth temperature. If this could be a problem, you may scale the errors by dividing them by the mean (or similar).
  • $\begingroup$ Thanks for your input, is there anywhere you can link to where I can read more about your "this can usually be taken as a measure of uncertainty" statement? $\endgroup$ Commented Jun 14, 2017 at 17:05
  • $\begingroup$ I actually don't have a single link. AFAIK this technique is often used in context with financial data analysis. But there is a much simpler answer on that: it is basically MC error propagation. You vary what you can vary (your network) and see how the output changes. This yields the possible deviation. But in the end, error propagation is usually a little bit more then that as it requires some domain-knowledge as well. Still, for some statistical part, the above MC error propagation is quite a good thing! $\endgroup$
    – Mayou36
    Commented Jun 14, 2017 at 20:56
  • $\begingroup$ Does MC mean Monte Carlo in your comment? Also, are you saying that this variance is a good thing because low-variance and high-variance results are MORE information and MORE information is good? $\endgroup$ Commented Jun 15, 2017 at 15:58
  • $\begingroup$ @user1367204, yes, MC means Monte Carlo, my bad! And yes, it is more information, namely it gives an estimation of how far off your value is at least. This is "good" in a sense, yes. $\endgroup$
    – Mayou36
    Commented Jun 15, 2017 at 18:37
  • $\begingroup$ Do you have any recommendation for a way to incorporate this information into a prediction report? $\endgroup$ Commented Aug 2, 2017 at 17:32

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