# Model Agnostic Learning of Semantic Features

## Contents

## Presented by

Milad Sikaroudi

## Introduction

Transfer learning is a line of research in machine learning which focuses on storing knowledge from one domain (source domain) to solve a similar problem in another domain (target domain). In addition to regular transfer learning, one can use "transfer metric learning" in which through utilizing a similarity relationship between samples [1], [2] a more robust and discriminative data representation is formed. However, both of these kinds of techniques work insofar as the domain shift, between source and target domains, is negligible. Domain shift is defined as the deviation in the distribution of the source domain and the target domain and it would cause the DNN model to completely fail. The multi-domain learning is the solution when the assumption of "source domain and target domain comes from an almost same distribution" may not hold. There are two variants of MDL in the literature that can be confused, i.e. domain generalization, and domain adaptation; however in domain adaptation, we have access to the target domain data somehow, while that is not the case in domain generalization. This paper introduces a technique for domain generalization based on two complementary losses that regularize the semantic structure of the feature space through an episodic training scheme originally inspired by the model-agnostic meta-learning.

## Previous Work

Originated from model-agnostic meta-learning (MAML), episodic training has been vastly leveraged for addressing domain generalization [3, 4, 5, 7, 8, 6, 9, 10, 11]. The method of MLDG [4] closely follows MAML in terms of back-propagating the gradients from an ordinary task loss on meta-test data, but it has its own limitation as the use of the task objective might be sub-optimal since it only uses class probabilities. Most of the works [3,7] in the literature lack notable guidance from the semantics of feature space, which contains crucial domain-independent ‘general knowledge’ that can be useful for domain generalization. The authors claim that their method is orthogonal to previous works.

### Model Agnostic Meta Learning

Also known as learning to learn, Model-agnostic Meta Learning is a learning paradigm in which optimal initial weights are found incrementally (episodic training) by minimizing a loss function over some similar tasks (meta-train, meta-test sets). Imagine a 4-shot 2-class image classification task as below:

Each of the training tasks provides an optimal initial weight for the next round of the training. By considering all of these sets of updates and meta-test set, the updated weights are calculated using the below algorithm.

## Method

In domain generalization, we assume that there are some domain-invariant patterns in the inputs (e.g. semantic features). These features can be extracted to learn a predictor that performs well across seen and unseen domains. This paper assumes that there are inter-class relationships across domains. In total, the MASF is composed of a **task loss**, **global class alignment** term and a **local sample clustering** term.

### Task loss

[math] F_{\psi}: X \rightarrow Z[/math] where [math] Z [/math] is a feature space [math] T_{\theta}: X \rightarrow \mathbf {R}^{C}[/math] where [math] C [/math] is the number of classes in [math] Y [/math] Assume that [math]\hat{y}= softmax(T_{\theta}(F_{\psi}(x))) [/math]. The parameters [math] (\psi, \theta) [/math] are optimized with minimizing a cross-entropy loss namely [math] \mathbf{L}_{task} [/math] formulated as:

[math] l_{task}(y, \hat{y} = - \sum_{c}1[y=C]log(\hat{y}_{c})) [/math]

Although the task loss is a decent predictor nothing prevents the model from overfitting to the source domains and suffering from degradation on unseen test domains. So the other loss terms are responsible for this aim.

### Global class alignment

In semantic space, we assume there are relationships between class concepts. And those relationships are invariant to changes in observation domains. Capturing and preserving such class relationships can help models generalize well on unseen data. To achieve this, a global layout of extracted features are imposed such that the relative locations of extracted features reflect their semantic similarity. Since [math] L_{task} [/math] focuses only on the dominant hard label prediction, the inter-class alignment across domains is disregarded. Hence, minimising symmetrized Kullback–Leibler (KL) divergence across domains, averaged over all [math] C [/math] classes has been used:

[math] l_{global}(D_{i}, D{j}; \psi^{'}, \theta^{'}) = 1/C \sum_{c=1}^{C} 1/2[D_{KL}(s_{c}^{(i)}||s_{c}^{(j)}) + D_{KL}(s_{c}^{(j)}||s_{c}^{(i)})], [/math]

The authors stated that symmetric divergences such as Jensen–Shannon (JS) showed no significant difference with KL over symm.

### Local cluster sampling

[math] L_{global} [/math] captures inter-class relationships, we also want to make semantic features close to each other locally. Explicit metric learning, i.e. contrastive or triplet losses, have been used to ensure that the semantic features, locally cluster according to only class labels, regardless of the domain. Contrastive loss takes two samples as input and makes samples of the same class closer while pushing away samples of different classes.

Conversely, triplet loss takes three samples as input: one anchor, one positive, and one negative. Triplet loss tries to make relevant samples closer than irrelevant ones.

[math] l_{triplet}^{a,p,n} = \sum_{i=1}^{b} \sum_{k=1}^{c-1} \sum_{\ell=1}^{c-1}\! [m\!+\!\|x_{i}\!- \!x_{k}\|_2^2 \!-\! \|x_{i}\!-\!x_{\ell}\|_2^2 ]_+, [/math]

## Model agnostic learning of semantic features

These losses are used in an episodic training scheme showed in the below figure:

## Experiments

The usefulness of the proposed method has been demonstrated using two common benchmark datasets for domain generalization, i.e. VLCS and PACS, alongside a real-world MRI medical imaging segmentation task. In all of their experiments, the AlexNet with ImageNet pre-trained weights has been utilized.

### VLCS

VLCS[12] is an aggregation of images from four other datasets: PASCAL VOC2007 (V) [13], LabelMe (L) [14], Caltech (C) [15], and SUN09 (S) [16] leave-one-domain-out validation with randomly dividing each domain into 70% training and 30% test.

Notably, MASF outperforms MLDG[4], in the table below on this dataset, indicating that semantic properties would provide superior performance with respect to purely highly-abstracted task loss on meta-test. "DeepAll" in the table is the case in which there is no domain generalization. In DeepAll case the class labels have been used only, regardless of the domain each sample would lie in.

### PACS

The more challenging domain generalization benchmark with a significant domain shift is the PACS dataset [17]. It contains art painting, cartoon, photo, sketch domains with objects from seven classes: dog, elephant, giraffe, guitar, house, horse, person.

As you can see in the table below, MASF outperforms state of the art JiGen[18], MLDG[4], MetaReg[3], significantly. In addition, the best improvement has achieved (6.20%) when the unseen domain is "sketch", which requires more general knowledge about semantic concepts since it is different from other domains significantly.

### Ablation study over PACS

The ablation study over the PACS dataset shows the effectiveness of each loss term.

### Deeper Architectures

For stronger baseline results, the authors have performed additional experiments using advanced deep residual architectures like ResNet-18 and ResNet-50. The below table shows strong and consistent improvements of MASF over the DeepAll baseline in all PACS splits for both network architectures. This suggests that the proposed algorithm is also beneficial for domain generalization with deeper feature extractors.

### Multi-site Brain MRI image segmentation

The effectiveness of the MASF has been also demonstrated using a segmentation task of MRI images gathering from four different clinical centers denoted as (Set-A, Set-B, Set-C, and Set-D). The domain shift, in this case, would occur due to differences in hardware, acquisition protocols, and many other factors, hindering translating learning-based methods to real clinical practice. The authors attempted to segment the brain images into four classes: background, grey matter, white matter, and cerebrospinal fluid. Tasks such as these have enormous impact in clinical diagnosis and aiding in treatment. For example, designing a similar net to segment between healthy brain tissue and tumorous brain tissue could aid surgeons in brain tumour resection.

The results showed the effectiveness of the MASF in comparison to not use domain generalization.

## Conclusion

A new domain generalization technique by taking the advantage of incorporating global and local constraints for learning semantic feature spaces presented which outperforms the state-of-the-art. The effectiveness of this method has been demonstrated using two domain generalization benchmarks, and a real clinical dataset (MRI image segmentation). The code is freely available at [19]. As future work, it would be interesting to integrate the proposed loss functions with other methods as they are orthogonal to each other and evaluate the benefit of doing so. Also, investigating the usage of the current learning procedure in the context of generative models would be an interesting research direction.

## Critiques

The purpose of this paper is to help guide learning in semantic feature space by leveraging local similarity. The authors argument may contain essential domain-independent general knowledge for domain generalization to solve this issue. In addition to adopting constructive loss and triplet loss to encourage the clustering for solving this issue. Extracting robust semantic features regardless of domains can be learned by leveraging from the across-domain class similarity information, which is important information during learning. The learner would suffer from indistinct decision boundaries if it could not separate the samples from different source domains with separation on the domain invariant feature space and in-dependent class-specific cohesion. The major problem that will be revealed with large datasets is that these indistinct decision boundaries might still be sensitive to the unseen target domain.

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