Apollo: An Adaptive Parameter-wise Diagonal Quasi-Newton Method for Nonconvex Stochastic Optimization
This is the Pytorch implementation for Apollo: An Adaptive Parameter-wise Diagonal Quasi-Newton Method for Nonconvex Stochastic Optimization
- Python >= 3.6
- Pytorch >= 1.5.0
- apex
- lmdb >= 0.94
- overrides
- tqdm
- Install NVIDIA-apex.
- Install Pytorch and torchvision
- In the latest version of Apollo, we changed
sigmafrom1.0to0.01to make its learning rate in a suitable range, not that different with previous algorithms (see out paper for details). To apply Apollo to your tasks, a reasonable set of hyper parameters to begin with islr=0.01, eps=1e-4, init_lr=1e-5, warmup=500. - Warmup plays a super important role for Apollo. Please set warmup to at least
100updates to achieve stable convergence.
| Method | CIFAR-10 (%) | CIFAR-10 (%) | ImageNet (%) | ImageNet (%) |
|---|---|---|---|---|
| milestone | cosine | milestone | cosine | |
| SGD | 93.94 (0.07) | 94.53 (0.27) | 77.57 (0.07) | 78.26 (0.08) |
| Adam* | 91.41 (0.30) | 91.56 (0.19) | 71.72 (0.13) | 71.19 (0.10) |
| RAdam* | 91.80 (0.04) | 91.88 (0.15) | 72.37 (0.08) | 71.64 (0.14) |
| Adam | 93.74 (0.15) | 94.24 (0.09) | 76.86 (0.06) | 77.54 (0.16) |
| RAdam | 93.88 (0.11) | 94.38 (0.25) | 76.91 (0.07) | 77.68 (0.08) |
| AdaBelief | 94.03 (0.11) | 94.51 (0.07) | 77.55 (0.07) | 78.22 (0.11) |
| AdaHessian | 93.97 (0.22) | 94.48 (0.17) | 77.61 (0.09) | 78.02 (0.10) |
| Apollo | 94.21 (0.08) | 94.64 (0.09) | 77.85 (0.07) | 78.45 (0.06) |
| ApolloW | 94.34 (0.12) | 94.76 (0.07) | 77.86 (0.09) | 78.48 (0.07) |
We use ResNet-110 for CIFAR-10 and standard ResNext-50 for ImageNet.
Note that ResNet-110 is a modified version of ResNet-18 to adapt the small image size 32x32 in CIFAR-10.
ResNet-110 is much smaller than ResNet-18, with 1.73M parameters (ResNet-18 has 11.69M parameters).
The following table summarizes the key hyper-parameters for different optimizers. For the model training of image classification, please go to this folder.
ResNet-110 on CIFAR-10
| Method | lr | weight decay | decoupled weight decay | eps | warmup updates | init_lr |
|---|---|---|---|---|---|---|
| SGD | 0.1 | 5e-4 | False | NA | 0 | NA |
| Adam* | 0.001 | 5e-4 | True | 1e-8 | 0 | NA |
| RAdam* | 0.001 | 5e-4 | True | 1e-8 | 0 | NA |
| Adam | 0.001 | 2.5e-1 | True | 1e-8 | 0 | NA |
| RAdam | 0.001 | 2.5e-1 | True | 1e-8 | 0 | NA |
| AdaBeleif | 0.001 | 2.5e-1 | True | 1e-8 | 0 | NA |
| AdaHessian | 0.15 | 1e-3 | True | 1e-2 | 500 | 1e-3 |
| Apollo | 0.01 | 2.5e-4 | False | 1e-4 | 500 | 1e-5 |
| Apollow | 0.01 | 2.5e-2 | True | 1e-4 | 500 | 1e-5 |
ResNext-50 on ImageNet
| Method | lr | weight decay | decoupled weight decay | eps | warmup updates | init_lr |
|---|---|---|---|---|---|---|
| SGD | 0.1 | 1e-4 | False | NA | 0 | NA |
| Adam* | 0.001 | 1e-4 | True | 1e-8 | 0 | NA |
| RAdam* | 0.001 | 1e-4 | True | 1e-8 | 0 | NA |
| Adam | 0.001 | 1e-1 | True | 1e-8 | 0 | NA |
| RAdam | 0.001 | 1e-1 | True | 1e-8 | 0 | NA |
| Adabelief | 0.001 | 1e-1 | True | 1e-8 | 0 | NA |
| AdaHessian | 0.15 | 1e-3 | True | 1e-2 | 500 | 1e-3 |
| Apollo | 0.01 | 1e-4 | False | 1e-4 | 500 | 1e-5 |
| ApolloW | 0.01 | 1e-2 | True | 1e-4 | 500 | 1e-5 |
Note that decoupled weight decay is applied to Adam, RAdam and AdaBelief.
| Method | Test PPL |
|---|---|
| SGD | 32.65 (0.13) |
| Adam | 36.68 (0.21) |
| RAdam | 36.20 (0.38) |
| AdaBelief | 32.83 (0.18) |
| Apollo | 31.94 (0.09) |
We use 2-layer LSTMs with 2048 hidden size on One Billion Words.
Some key hyper-parameters are listed in the following table.
For the model training of language modeling, please go to this folder.
2-layer LSTM on One Billion Words
| Method | lr | weight decay | decoupled weight decay | eps | warmup updates | init_lr | gradient clip |
|---|---|---|---|---|---|---|---|
| SGD | 0.5 | 0 | False | NA | 0 | NA | 1.0 |
| Adam | 0.001 | 0 | True | 1e-8 | 0 | NA | 1.0 |
| RAdam | 0.001 | 0 | True | 1e-8 | 0 | NA | 1.0 |
| AdaBelief | 0.001 | 0 | True | 1e-12 | 0 | NA | 1.0 |
| Apollo | 0.1 | 0 | False | 1e-4 | 500 | 1e-5 | 1.0 |
Since the weight decay rate is zero for all the optimizers, there is no difference between standard L2 regularization and decoupled weight decay.
| Method | Test BLEU |
|---|---|
| SGD | 26.59 (0.07) |
| Adam | 27.84 (0.12) |
| RAdam | 28.15 (0.15) |
| AdaBelief | 28.14 (0.11) |
| Apollo | 28.34 (0.10) |
We use the Transformer-base models. Some key hyper-parameters are listed in the following table. For the details of NMT experiments, please go to this repo.
Transformer-base on WMT-14 En-De
| Method | lr | weight decay | decoupled weight decay | eps | lr scheduler | warmup updates | init_lr | gradient clip |
|---|---|---|---|---|---|---|---|---|
| SGD | 0.1 | 1e-6 | False | NA | milestone | 1000 | 1e-4 | 1.0 |
| Adam | 0.0005 | 1e-4 | True | 1e-8 | inverse sqrt | 4000 | 1e-7 | 1.0 |
| RAdam | 0.0005 | 1e-4 | True | 1e-8 | milestone | 0 | NA | 1.0 |
| AdaBelief | 0.0005 | 1e-4 | True | 1e-16 | milestone | 1000 | 1e-7 | 1.0 |
| Apollo | 0.1 | 1e-8 | False | 1e-4 | milestone | 1000 | 1e-5 | 1.0 |
1. Weight Decay:
-
The strength of
weight decayhas significant impact on both the performance of convergence speed and generalization accuracy. Thus, as discussed in the paper, we suggest to consider the effect of regularization strength when we analyze the performance of different optimization methods. -
For adaptive optimizers, including Adam, RAdam and AdaBelief, different implementations of
weight decay, such as the decoupled version, lead to very different regularization strength with the sameweight decay rate. -
In this paper, for fair comparison, we comprehensively tune the
learning rateand theweight decay ratefor all the optimizers on CIFAR-10. For ImageNet, due to the resource limits, we kept all the hyper-parameters selected from CIFAR-10 for each optimizer, and only tuned theweight decay rate. One motivation of this is to test the consistency of hyper-parameters of these optimizers on different tasks. -
We analyzed the effect of different
weight decay rateson different optimizers. As illustrated in the figure, Apollo achieves improvements over all the three baselines on convergence speed with different rates of weight decay.
2. Epsilon:
We found that AdaBelief is very sensitive to the value of epsilon.
In our experiments, Adam, RAdam and Apollo used a fixed epsilon for different tasks (1e-8 for Adam and RAdam, and 1e-4 for Apollo).
But for AdaBelief, we had to finetune epsilon for different tasks, e.g. 1e-8 for image classification, 1e-12 for language modeling, and 1e-16 for neural machine translation.
With other values, the results of AdaBelief are even worse than Adam (e.g, we tried 1e-8 and 1e-16 for language modeling and the PPL points are higher than 37).
Thus, we suspected that the improvements of AdaBelief over Adam or RAdam mainly come from the fine-tuning of epsilon.
Similar observations were reported in the EAdam paper.