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by (Data Scientist at )
On a more serious note, the goal of this paper is to find the best option to predict accurately future connections in a graph, which you can also call a network. Not a tiny, harmless network. No, we are talking about large-scale networks. The big and horrendous ones made of billion of nodes and edges which Facebook, Google (and Cdiscount) have had to deal with on a daily basis for the last few years.
What is the point of predicting new links when you already have plenty of them ?We have seen this question coming from a mile away, and we have got you covered, don’t worry. It is in the human nature (and even more in the Data Scientist one), to want more than what we already have. We don’t settle for the present, we want to know the future as well. Therefore, we need to find a way to perform predictions as accurate as possible.
Furthermore, a network is what we can call a dynamic structure as it evolves with time. For instance, social networks such as Facebook, Twitter, LinkedIn etc. change permanently as new connections appear while some others are removed from the graph. For this particular example, one of the biggest challenges is to make accurate recommendations to the users. They may know somebody in real life, but aren’t connected with that person on their favourite social network. Thus, the target in this case would be to predict (and recommend) this association (link in the graph), in order to fix what can be seen as a mistake. Link prediction can help rebuild the real life, but it could actually do more than just that. What we observe isn’t always ideal. An example would be terror attacks : given relationships between terrorists, you can build a network which represents who worked with who in the past. Link prediction can help predict future associations, allowing a government to monitor suspects and prevent them from committing a terror attack together. Biology is another area where link prediction can be a key asset, as human brains aren’t enough to predict all associations between molecules, having an artificial intelligence to do the job can be a massive boost. To put it in a nutshell, link prediction can be used for various purposes, in many different areas. In this article, we will focus mainly on the collaboration network case. We will work with the (See [1] for more details). This is a co-authorship network where two authors are connected if they publish at least one paper together, so we will try to predict relevant future collaborations here (we would like to avoid awkward situations).
We can define the graph’s adjacency matrix (of dimension |V| × |V|) as A = [A_ij] with (i, j) ∈ V. For an undirected and unweighted graph :
Sadly, Medium does not support MathJax (the engine generally used to parse LaTeX inline equations)…
The part we are entering is a tricky one, so fasten your seat belt, we don’t want to lose you now. Splitting a dataset into training/test/validation sets isn’t a difficult concept to understand in normal circumstances. When it comes to graphs, it is a bit different. How can you split a graph to achieve a learning task ? First of all it is important to remember precisely our purpose : we want to predict links (edges) between nodes.
The first capital information is the following one : the predictive algorithm will take as input node pairs and evaluate whether the nodes present the properties to be linked in the future. In this paper, we will only look at nodes which are at distance 2. What remains to be clarified now is the output : how can we create ground-truth labels from the graph ? The idea is to take a graph, hide some of its edges and monitor the results produced by the algorithm. For hidden links the label is 1, for non-existent links it is 0. Not clear enough yet ? No problem, let’s illustrate the concept with a minimal example :From the left to the right we have :
If you are still firmly with us at this point, then you have understood that our training set (with the corresponding labels) looks like the table below.
Make no mistake, the edge (D, H) for example has the label 0 here because it doesn’t exist in the Test Graph, even though it was originally present in the Validation Graph.
As we are evaluating all the 2-hop “missing link” node pairs we can see that the edges we have hidden have label of 1 while the rest have a label of 0. Let’s remember that this is just a minimal example, although we can already see several interesting facts :Let’s now discover what are the unsupervised methods we can choose to perform link prediction in a graph, digging deepeer into the notions of neighborhood and local similarity in the process.
If the nodes in the graph don’t possess properties, as is the case in our study, the only information available comes from the topological structure of the graph. By that, we mean the neighborhood of a node : how many neighbors has this node got ? How many neighbors these neighbors themselves have ? How are they organised ? As we are evaluating node pairs we can also look at how similar a node u can be to a node v by looking at their “distance” in the graph, the similarity of their local neighborhood.
All of this has led to several local similarity indices such as Common Neighbors, Jaccard Similarity, Adamic-Adar Index, Resource Allocation, etc (more can be found in [2] and [3]). These indices will return a score s ∈ ℝ which will be used to perform predictions. As it is explained in [3], you will also need to set a threshold value above which you assign the label 1. We sense that you may be asking which unsupervised method is the best to perform predictions. This is a tricky question as in some cases, one measure will outperform others, but in other cases it will be another one, etc.
And what if we didn’t actually have to choose ? What if we let something else combine those local similarity indices to get a score in return ? You’ve got it right, we are heading straight to the Supervised Learning universe.We have already discussed how to obtain labels. Now we need features in order to perform Supervised Learning (Binary Classification). And yes, you guessed it, these features will come from the latest part we discussed. Based on Kolja Esders’s work in [3], we will use unsupervised scores as features for our predictive model. We will also use the notion of Community (further details can be found in [4]).
The following features will be included in our learning/prediction task : Common Neighbors (CN), Jaccard Coefficient (JC), Adamic-Adar index (AA), Resource Allocation (RA), Preferential Attachement (PA), Adjusted-Rand (AR) and Neighborhood Distance (ND) which are all local indices to which we will add the Total Neighbors (TN), Node Degree (UD et VD) and Same Community (SC) features. They are defined as:
As for Adjusted-Rand here is a table giving the meaning of a, b, c and d :
Before going into predictions, we just need to discuss the evaluation metric which will help us determine whether Supervised Learning is better than the Unsupervised one (Spoiler alert : from Kolja Esders and our own experience in the past, it seems that it is the case) and it happens in the very next part.
Considering two independent and identically distributed observations (X1; Y1) and (X2; Y2), the AUC of a scoring method S can be written in the following manner :
In other words, a perfect algorithm (which would get an AUC of 1) would give higher scores to every node pairs having a label of 1 than node pairs having a label of 0. This is just a matter of score order, whichever score is used. In the next section we will put several algorithms face to face in the arena and compare their performances :
He has just gone and done it again, hasn’t he ? The mighty Gradient Boosting algorithm has once again outperformed all his opponents. We will admit it wasn’t a completely fair contest though. This is what we can call an “easy” graph as we reach an AUC score of 0.96 with XGBoost (which is very close to perfection), but methods such as Resource Allocation and the Adamic-Adar Index also performed very well with respective AUC scores of 0.93 and 0.92. As we can see, Common Neighbors is a bit more limited in this case with an AUC of 0.78, so only counting common friends may not be the best strategy if you want to have new friends it seems !
Tree-based boosting algorithms also provide “feature importance”, and an interesting fact here is that there seems to be a correlation between the feature importance of a similarity indice and its prediction quality :
Resource Allocation was the “most important feature” according to this graph, and also as we saw previously, the best unsupervised method. It is quite similar to the Adamic-Adar index, with the only difference being the log at the denominator. In that regard, this may make RA more discriminating than AA as it penalises more the common neighbors which have many neighbors themselves.
This was an “easy” network as we got really high AUC scores, but depending on the complexity and noise in the graph you are working on, this can be more or less difficult to predict accurately future links. The gap between supervised and unsupervised scores can also widen with complex networks.
We decided to use the XGBoost algorithm but it is of course possible to use any other Machine Learning algorithm, so you can try to reproduce this experiment with your favourite binary classifier ! Data processing has been realised using the Networkit library, so you will need it (find more ).
As we never settle for what we possess, the aim in the future would be to perform even better predictions. Building and adding new features to the model may help improve the performance as it would add information. Scaling data before feeding the model could also slightly improve the performance. And this is how it ends ! We hope that you enjoyed this journey with us through the link prediction problem in a large-scale network. As the code and data are available in addition to this paper, feel free to reproduce this experience and even improve it if you can ! Thank you for your attention.