Algorithm A.

The first stage corresponds to defining weighted links between the tags. Probably the most natural choice is given by the number of co-occurrences, (the number of objects tagged simultaneously by the given two tags). Since we are aiming at a directed network, (in which links are pointing from tags higher in the hierarchy towards descendants lower in the hierarchy), in this initial stage we actually assume two separate links pointing in the opposite direction for every pair of co-occurring tags, (with both links having the same weight).

In the next step we prune the network by throwing away a part of the links. Instead applying a global threshold, for each tag we remove incoming links with a weight smaller than fraction of the weight of the strongest incoming link on . According to our tests on the protein function data set, the quality of the results was only slightly effected by changing . (Our quality measures and the description of the data sets are given in forthcoming sections). Nevertheless, an optimal plateau was observed in the quality as a function of between and , as discussed in details Sect.S1.1.2 in File S1. Thus, in the rest of the paper we show results obtained at .

After the complete link removal process has been finished, the direct ancestor of tag is chosen from the remaining in-neighbors as follows. We calculate the -score for the co-occurrence with each in-neighbor individually, given by the difference between the number of observed co-occurrences and the number of expected co-occurrences at random, scaled by the standard deviation, (based on the tag frequencies, more details on the -score are given in Methods). The in-neighbor with the highest -score is usually identified as the direct ancestor, and all other incoming links are deleted on . However, there is a very important exception to this rule: in case the link “survived” when thresholding the incoming links on . This means that happens to be also a candidate for the ancestor of , and actually the two tags are more likely to be siblings. In this scenario we go down the list of remaining in-neighbors of in the order of the -score, until we find a candidate for which the link was already deleted, and identify as the ancestor of . In case no such in-neighbor can be found, becomes a local root, with temporally no incoming links.

In the last phase of the algorithm we first choose a global root from the local ones according to the maximum entropy of their incoming link weight distribution: if the incoming link weights on are given by with , then entropy can be written as . The reasoning behind this choice is that a large entropy usually corresponds to a large number of direct descendants with more or less uniform weight distribution. After the global root has been chosen, we go through the list of local roots in the order of their entropy, and link them under their partner with which they co-occur most frequently. (To avoid the formation of loops, we choose only from co-occurring partners located in another subtree).

The result of the algorithm is a directed tree, since we assign one direct ancestor to every tag during the process, (except the global root), and we do not allow loops. The complexity of the algorithm can be estimated as , where denotes the number of objects, and stands for the number of links in the co-occurrence network between the tags. (The details and the pseudo code of the algorithm are given in Sect.S1.1.1 in the File S1).

Algorithm B.

In case of algorithm B the weight of the links in the network between the tags is the same as in algorithm A, namely the number of objects the tags co-occurred on. However, instead of parallel directed links pointing in the opposite direction, here we consider only single undirected links. Similarly to algorithm A, in the second phase we remove a part of the links from the network. However, in this case we use the -score between connected pairs as a threshold, i.e., if the -score is below 10, the given link is thrown away. (The optimal value for the -score threshold was set based on experiments on our synthetic benchmark, as detailed in Sect.S1.2.2 in File S1.) There is one exception to the above rule of thresholding: if a tag appears on more than half of the objects of the other tag, then the corresponding link is kept even if the -score is low.

Next, the eigenvector centrality is calculated for the tags based on the weighted undirected network remaining after the thresholding, and the tags are sorted according to their centrality value. The hierarchy is built from bottom up: starting from the tag with the lowest eigenvector centrality we choose the direct ancestor of the given tag from its remaining neighbors according to a couple of simple rules. First of all, the ancestor must have a higher centrality. The reasoning behind this is that the eigenvector centrality is analogous to PageRank. Thus, the centrality of a tag is high if it is connected to many other high centrality tags, and therefore, higher centrality values are likely to appear on more frequent and more general tags.

In case the tag has more than one remaining neighbor with a higher centrality value, we choose the candidate which is the most related to and the set of tags already classified as a descendant of . This is implemented by aggregating the -score between the given candidate and the tags in the branch starting from , (including as well), and selecting according to the highest aggregated -score value. We note that this is a unique feature of the algorithm: by aggregating over the descendants of we are using more information compared to simple similarity measures, and hence, are more likely to choose the most related candidate as the parent of .

Since we iterate over the tags in reverse order according to their centrality value, and ancestors have always higher centralities compared to their descendants, no loops are formed during the procedure. The complexity of the method can be estimated as , where stands for the number of objects and denotes the number of different tags. (The details and the pseudo code of the algorithm are given in Sect.S1.2.1 in the File S1).

Simple quality measures.

Before actually discussing the results given by tag hierarchy extracting methods in different systems, we need to specify a couple of measures for quantifying the quality of the obtained hierarchies. The natural representation of a hierarchy is given by a directed acyclic graph (DAG), in which links are pointing from nodes at higher level in the hierarchy towards related other nodes lower in the hierarchy. If the exact tag hierarchy is known, the problem is mapped onto measuring the similarity between the DAG obtained from the tag hierarchy extraction method, the “reconstructed” graph, and the exact DAG, .

A simple and natural idea is taking the ratio of exactly matching links in , denoted by , as a primary indicator. In case has only a single connected component, is simply given by the number of links also present in , divided by the total number of links in , denoted by . However, if contains only a few links with a vast number of isolated nodes, this sort of normalization can lead to a unrealistically high value, in case the links happen to be exactly matching. Thus, in the general case we normalize the number of exactly matching links by , where corresponds to the number of links needed for creating a tree between the tags.

In a more tolerant approach we may also accept links between more distant ancestor descendant pairs according to the exact hierarchy, (e.g., links pointing from “grandparents” to “grandchildren”). Beside the ratio of acceptable links, , we can measure the ratio of links between unrelated tags, as well, (these are pairs which are not connected by any directed path in ), and also the ratio of “inverted” links, , pointing in the opposite direction compared to , or connecting more distant ancestor descendant pairs in the wrong direction. Furthermore, when , the ratio of missing links from , denoted by , is another important indicator of the effectiveness of the algorithm. (If is composed of only a single component, is 0 by definition.) Similarly to , all quality indicators introduced so far are normalized by . These measures are not completely independent of each other, i.e., the ratio of acceptable links is always larger than or equal to the ratio of exactly matching links, , and also .

Normalized mutual information between hierarchies.

A somewhat more elaborate approach to measuring the quality of the reconstructed hierarchy can be given by the normalized mutual information, (NMI), introduced originally in information theory for measuring the mutual dependence of two random variables [52], [53]. (The definition of the NMI in general is given in Methods). A very important application of the NMI is related to the problem of comparing different partitioning of the same graph into communities [54], [55]. The advantage of the NMI approach when comparing hierarchies is that the resulting similarity measure is sensitive not only to the amount of non-matching links, but also to the position of these links in the hierarchies. In other words, the change in the similarity is different for rewiring a link pointing to a leaf and for rewiring a link higher in the hierarchy.

When judging the similarity between two hierarchies, a natural idea is to compare the sets of descendants for each tag in the corresponding DAGs. E.g., if the set of descendants of tag is in the exact hierarchy and in the reconstructed one, then the number of tags in the intersection of these two sets is given by . Roughly speaking, the higher the value of this quantity over all tags, the higher is the similarity between the two hierarchies. To build a similarity measure from this concept in the spirit of the NMI, first we define as the probability for picking a tag from the descendants of at random in the exact hierarchy, where denotes the total number of tags in . (Since the tag is not included in , the possible maximum value for is ). Similarly, the probability for choosing a tag from the descendants of at random in is given by , while the probability for picking a tag from the intersection between the descendants of in the two hierarchies can be written as . Based on this, the NMI between the exact- and reconstructed hierarchies can be formulated as (1)

This measure is 1 if and only and are identical, and is 0 if the intersections between the corresponding branches in the two hierarchies is of the same magnitude as we would expect at random, or in other words, if and are independent. The similarity defined in the above way is very closely related to the NMI used in community detection [54], [55], the analogy between the two quantities can be made explicit by an appropriate mapping from the hierarchy between the tags to a partitioning of the tags, (further details are given in Sect.S2.1 in File S1).

We examined the behavior of the NMI given in (1) by taking a binary tree of 1,023 nodes, , and comparing it to its randomized counterpart, , obtained by rewiring a fraction of links to a random location. In Fig.1. we show the measured NMI as a function of . If we start the rewiring with links pointing to leafs, and continue according to the reverse order in the hierarchy, the NMI shows a close to linear decay as a function of almost in the entire interval (purple circles). However, if links are chosen in random order, is decreasing much faster in the small region, with an overall non-linear dependency (blue squares). An even steeper decay can be observed when links are chosen in the order of their position in the hierarchy (green triangles). Nevertheless, when in all cases, thus, the similarity defined in this way is vanishing for a pair of independent DAGs. Meanwhile, the significant difference between the three curves displayed in Fig.1c shows that the NMI is sensitive also to the position of the rewired links in the hierarchy: rewiring the top levels of the hierarchy is accompanied by a drastic drop in the similarity, while changes at the bottom of the hierarchy cause only a minor decrease, which is linear in the fraction of rewired links.

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Figure 1. Using the normalized mutual information (NMI) for measuring the similarity between hierarchies.

We tested the behavior of the NMI by applying (1) to a binary tree of 1,023 nodes, , and its randomized counter part, , obtained by rewiring the links at random, as shown in the illustration at the top. The decay of the obtained NMI is shown in the bottom panel as a function of the fraction of the rewired links, . The three different curves correspond to rewiring the links in reverse order according to their position in the hierarchy (purple circles), rewiring in random order (blue squares) and rewiring in the order of the position in the hierarchy (green triangles). The concept of the linearized mutual information (LMI) for the general tag hierarchy reconstruction problem is illustrated in red: By projecting the measured value onto the axis via the blue curve we obtain , giving the fraction of rewired links in a randomization process with the same NMI value. The LMI is equal to , corresponding to the fraction of unchanged links.

https://doi.org/10.1371/journal.pone.0084133.g001

This non-trivial feature of the NMI allows the introduction of another interesting quality measure for a reconstructed hierarchy. Supposing a similar randomization procedure on as shown in Fig.1, we may ask what fraction of links has to be rewired on average for reaching the same NMI as ? The formal definition of this measure is given as follows. Let denote the average NMI obtained for a fraction of randomly rewired links, where the links are chosen in random order, . By projecting the NMI between the exact- and reconstructed hierarchies, , to the axis using this function as (2) we receive the fraction of randomly chosen links to be rewired in for obtaining a randomized hierarchy with the same NMI as , (see Fig.1 for illustration). Based on that we define the linearized mutual information, (LMI) as (3)

This quality measure corresponds to the fraction of unchanged links in a random link rewiring process, resulting in a hierarchy with the same NMI as . (The reason for calling it “linearized” is that (3) is actually projecting to the linear curve). By comparing the LMI to the fraction of exactly matching links, , we gain further information on the nature of the reconstructed DAG: If is significantly larger than , the reconstructed DAG is presumably better for the links high in the hierarchy, whereas if is significantly lower than , the reconstructed DAG is more precise for links close to the leafs.

Reconstructing the hierarchy of protein functions.

Although the primary targets of tag hierarchy extraction methods are given by tagging systems with no pre-defined hierarchy between the tags, for testing the quality of the extracted hierarchy we need input data for which the exact hierarchy is also given. A very important real tag hierarchy is provided by protein functions as described in the Gene Ontology [56], organizing function annotations into three separate DAGs corresponding to “biological process”, “molecular function” and “cellular component” oriented description of proteins. The corresponding input data for a tag hierarchy extraction algorithm would be a collection of proteins, each tagged by its function annotations. Luckily, the Gene Ontology provides also a regularly updated large data set enlisting proteins and their known functions aggregated from a wide range of sources, (a more detailed description of the data set we used is given in Materials and Methods).

In Fig.2a we show a smaller subgraph from the hierarchy between molecular functions given in the Gene Ontology, , together with the subgraph between the same tags in the result obtained by running our algorithm A on the tagged protein data set, , displayed in Fig.2b. The matching between the two subgraphs is very good: the majority of the connections are either exactly the same (shown in green), or acceptable (shown in orange), by-passing levels in the hierarchy and e.g., connecting “grandchildren” to “grandparents”. The appearing few unrelated– and missing links are colored red and gray, respectively.

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Figure 2. Comparison between the exact hierarchy and the reconstructed hierarchy obtained from algorithm A.

a) A subgraph in the hierarchy of protein functions, (describing molecular functions), according to the Gene Ontology, treated as the exact hierarchy, . b) The hierarchy between the same tags obtained from running algorithm A on the tagged protein data set, (the reconstructed hierarchy, ). The exactly matching- and acceptable links are colored green and orange respectively, the unrelated links are shown in red, while the missing links are colored gray. c) The list of included protein functions in panels (a) and (b).

https://doi.org/10.1371/journal.pone.0084133.g002

The quality measures obtained for the complete reconstructed hierarchy are given in table 1. For comparison we also evaluated the same measures for algorithm B, the algorithm by P. Heymann and H. Garcia-Molina, and the algorithm by P. Schmitz. According to the results all 4 methods perform rather well, however, our algorithm seems to achieve the best scores. Although the ratio of exactly matching links is , (which is not very high), the ratio of acceptable links is reaching , which is very promising. The NMI given by (1) is , however, the LMI according to (3) is . (The corresponding plot showing the decay of the NMI between the Gene Ontology hierarchy and its randomized counterpart is given in Sect.S2.2 in File S1). Thus, the similarity between our reconstructed hierarchy and the hierarcy from the Gene Ontology is so high that if we would randomize the Gene Ontology, (by rewirnig the links in random order), the same NMI value would be reached already after rewiring 22% of the links. The large difference between and in favour of indicates that our algorithm is better at predicting links higher in the hierarchy. E.g., in a randomization with random link rewiring order keeping only of the links unchanged, the NMI would be around instead of the actualy measured . The reason why can stay relatively high for the reconstructed hierarchy is that the majority of the non-matching links are low in the hierarchy, therefore, have a smaller effect on the NMI.

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Table 1. Quality measures for the reconstructed hierarchies in case of the protein function data set.

https://doi.org/10.1371/journal.pone.0084133.t001

Hierarchy of Flickr tags.

One of the most widely known tagging systems is given by Flickr, an online photo management and sharing application, where users can tag the uploaded photos with free words. Since the tags are not organized into a global hierarchy, this system provides an essential example for the application field of tag hierarchy extracting algorithms. We have run our algorithm B on a relatively large, filtered sample of photos, (the details of the construction of our data set are given in Methods). Although the “exact” hierarchy between the tags is not known in this case, since the tags correspond to English words, we can still give a qualitative evaluation of the result just by looking at smaller subgraphs in the extracted hierarchy.

An example is given in Fig.3., showing a few descendants of the tag “reptile” in our reconstruction. Most important direct descendants are “snake”, “lizard”, “alligator” and “turtle”. The tags under these main categories seem to be correctly classified, e.g., “alligator snapping turtle” is under “turtle”, (instead of the also related “alligator”). Interestingly, Latin names (binomial names) from the taxonomy of “reptilia” form a further individual branch under “reptile”, however, occasionally we can also see binomial names directly connected to the corresponding English name of the given species. More examples from our result on the Flickr data are given in Sect.S3.1 in File S1, which taken together with Fig.3 give an overall impression of a meaningful hierarchy, following the “common sense” by and large. (Furthermore, similar samples from the hierarchies extracted by the other methods are also given in Sect.S3.2 in File S1.)

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Figure 3. Subgraph from the hierarchy between Flickr tags.

By running our algorithm B on a filtered sample from Flickr, we obtained a hierarchy between the tags appearing on the photos in the sample. Since the total number of tags in our data reached 25,441, here we show only a smaller subgraph from the result, corresponding to a part of the tags categorized under “reptile”. Stubs correspond to further direct descendants not shown in the figure, and the size of the nodes indicate the total number of descendants on a logarithmic scale, (e.g., “prairie rattlesnake” has none, while “snake” has altogether 110.).

https://doi.org/10.1371/journal.pone.0084133.g003

Hierarchy of IMDb tags.

Another widely known online database is given by the IMDb, providing detailed information related to films, television programs and video games. One of the features relevant from the point of view of our research is that keywords related to the genre, content, subject, scenes, and basically any relevant feature of the movies are also available. These can be treated similarly to the Flickr tags, i.e., they are corresponding to English words, which are not organized into a hierarchy. In Fig.4. we show results obtained by running Algorithm B on a relatively large, filtered sample of tagged movies. (The details of the construction of the data set are given in Methods). Similarly to the Flickr data, we display a smaller part of the branch under the tag “murder” in the extracted hierarchy. Most important direct descendants are corresponding to “death”, “prison” and “investigation”, with “blood”, “suspect” and “police detective” appearing on lower levels of the hierarchy. Although the tags appearing in the different sub-branches are all related to their parents, the quality of the Flickr hierarchy seemed a bit better. This may be due to the fact that keywords can pertain to any part of the movies, and hence, the tags on a single movie can already be very diverse, providing a more difficult input data set for tag hierarchy extraction. Nevertheless, this result reassures our statement related to the Flickr data, namely that the hierarchies obtained from our algorithm have a meaningful overall impression. (Similar samples from the hierarchies obtained with the other methods are shown in Sect.S3.2 in File S1.)

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Figure 4. Subgraph from the hierarchy between IMDb tags.

The results were obtained by running Algorithm B on a filtered sample of films from IMDb, tagged by keywords describing the content of the movies. Here we show only a smaller subgraph between the descendants of “murder”, where stubs correspond to further direct descendants not shown in the figure, and the size of the nodes indicate the total number of descendants on a logarithmic scale.

https://doi.org/10.1371/journal.pone.0084133.g004

Defining the benchmark system.

Providing adjustable benchmarks is very important when testing and comparing algorithms. The basic idea of a benchmark in general is given by a system, where the ground truth about the object of search is also known. However, for most real systems this sort of information is not available, therefore, synthetic benchmarks are constructed. E.g., community finding is one of the very intensively studied area of complex network research, with an enormous number of different community finding algorithms available [25]. Since the ground truth communities are known only for a couple of small networks, the testing is usually carried out on the LFR benchmark [27], which is a purely synthetic, computer generated benchmark: the communities are pre-defined, and the links building up the network are generated at random, with linking probabilities taking into account the community structure. The drawback of such synthetic test data is its artificial nature, however, the benefit on the other side is the freedom of the choice of the parameters, enabling the variance of the test conditions on a much larger scale compared to real systems.

Here we propose a similar synthetic benchmark system for testing tag hierarchy extraction algorithms. The basic idea is to start from a given pre-defined hierarchy, (the “exact” hierarchy), and generate collections of tags at random, (corresponding to tagged objects in a real system), based on this hierarchy. The tag hierarchy extraction methods to be tested can be run on these sets of tags, and the obtained hierarchies, (the "reconstructed" hierarchies), can be compared to the exact hierarchy used when generating the synthetic data. When drawing an analogy between this system and the LFR benchmark, our pre-defined hierarchy is corresponding to the pre-defined community structure in the LFR benchmark, while the generated collections of tags are corresponding to the random networks generated according to the communities.

To make the above idea of a synthetic tagging system work in practice, we have to specify the method for generating the random collections of tags based on the given pre-defined hierarchy. In general, the basic idea is that tags more closely related to each other according to the hierarchy should appear together with a larger probability compared to unrelated tags. To implement this, we have chosen a random walk approach as suggested in [58]. The first tag in each collection is chosen at random. For the rest of the tags in the same collection, with probability we start a short undirected random walk on the hierarchy starting from the first tag, and choose the endpoint of the random walk, or with probability we again choose at random. An illustration of this process is given in Fig.5, (a brief pseudo-code of the data generation algorithm is given in Algorithm S4 in File S1). The parameters of the benchmark are the following: the pre-defined hierarchy between the tags, the frequency of the tags when choosing at random, the probability for generating the second and further tags by random walk, the length of the random walks, the number of objects and finally, the distribution of the number of tags per object. Although this is a long list of parameters, the quality of the reconstructed hierarchy is not equally sensitive to all of them. E.g., according to our experiments change in the topology of the exact hierarchy, or in the length of the random walk have only a minor effect, while the distribution of the tag frequencies seems to play a very important role.

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Figure 5. Generating tags on virtual objects by random walks on the hierarchy.

The objects in this approach are represented simply by collections of tags. For a given collection, the first tag is picked at random, (illustrated in red), while the rest of the tags are obtained by implementing a short undirected random walk on the DAG, starting from the first tag, (illustrated in purple).

https://doi.org/10.1371/journal.pone.0084133.g005

Protein data.

Both the exact DAG describing the hierarchy between protein functions and the corresponding input data set given by proteins tagged with known function annotations were taken from the Gene Ontology [56]. The hierarchy of protein function is composed of three separate DAGs, corresponding to “molecular function”, “biological process” and “cellular component”. We concentrated on molecular functions, where the complete DAG has altogether 6,469 tags. However, a considerable part of these annotations are rather rare, thus, reconstructing the complete hierarchy would be a very hard task due to the lack of information. Therefore, we took a smaller subgraph, namely the branch starting from “catalytic activity”, counting 4,181 tags, most of which are relatively more frequent.

For the data set of proteins, tagged with their known molecular function annotations, we took the monthly (quality controlled) release as in 2012.08.01. For simplicity, we neglected proteins lacking any tags appearing in the exact hierarchy, and deleted all annotations which are not descendants of “catalytic activity”. The resulting smaller data set contained 5,913,610 proteins, each having on average 3.7 tags. This data set, (together with the corresponding exact DAG) is available at (http://hiertags.elte.hu).