PageRank explained in simple terms!
In my previous article, we talked about information retrieval and how machines can read the context from free text. Let’s talk about the biggest web information retrieval engine, Google, and the algorithm that powers its search results: the Google PageRank algorithm. Imagine you were to create a Google search in a world devoid of any search engine. What basic rules would you code to build such a search engine? If your answer is to use a Term Frequency or TF-IDF framework, consider the following case:
A user enters the query : “Harvard Business School“. He expects the first link to be “http://www.harvard.edu/”. But what would your algorithm do? It would try to find out pages which has the word “Harvard” maximum number of times, as “Business” and “School” will come out to be common words. Now, there is a possibility that “Harvard” keyword might not be repeated multiple times on Harvard’s own website. However, websites like Business school consultants or articles on business school might have this keyword multiple times. This leads these websites to achieve a rank much higher than the actual business school website. Thanks to the Google PageRank algorithm, which takes into account not only the frequency of keywords but also the quality and quantity of links to a website.
But, do search engines like Google face this challenge today? Obviously not! This is because they take help of an algorithm known as PageRank. In this article, we will discuss the concept of PageRank. In the next article, we will take this algorithm a step forward by leveraging it to find the most important packages in R.
An artificial web world
Imagine a web which has only 4 web pages, which are linked to each other. Each of the box below represents a web page. The words written in black and italics are the links between pages.
For instance, in the web page “Tavish”, it has 3 outgoing links : to the other three web pages. Now, let’s draw a simpler directed graph of this ecosystem.
Here is how Google ranks a page : The page with maximum number of incoming links is the most important page. In the current example, we see that the “Kunal Jain” page comes out as the most significant page.
Mathematical Formulation of Google Page Rank
First step of the formulation is to build a direction matrix. This matrix will have each cell as the proportion of the outflow. For instance, Tavish (TS) has 3 outgoing links which makes each proportion as 1/3.
Now we imagine that if there were a bot which will follow all the outgoing links, what will be the total time spent by this bot on each of these pages. This can be broken down mathematically into following equation :
A * X = X
Here A is the proportions matrix mentioned above
X is the probability of the bot being on each of these pages
Clearly, we see that Kunal Jain’s page in this universe comes out to be most important which goes in the same direction as our intuition.
Now, imagine a scenario where we have only 2 web pages : A and B. A has a link to B but B has no external links. In such cases, if you try solving the matrix, you will get a zero matrix. This looks unreasonable as B looks to be more important than A. But, our algorithm still gives same importance for both. To solve for this problem, a new concept of teleporatation was introduced. We include a constant probability of alpha to each of these pages. This is to compensate for instances where a user teleports from one webpage to other without any link. Hence, the equation is modified to the following equation :
(1-alpha) * A * X + alpha * b = X
Here, b is a constant unit column matrix. Alpha is the proportion of teleportation. The most common value taken for alpha is 0.15 (but can depend on different cases).
Other uses of PageRank Algorithm & End Notes
In this article we discussed the most significant use of PageRank. But, the use of PageRank is no way restricted to Search Engines. Here are a few other uses of PageRank :
- Finding how well connected a person is on Social Media : One of the unexplored territory in social media analytics is the network information. Using this network information we can estimate how influential is the user. And therefore prioritize our efforts to please the most influential customers. Networks can be easily analyzed using Page Rank algorithm.
- Fraud Detection in Pharmaceutical industry : Many countries including US struggle with the problem of high percentage medical frauds. Such frauds can be spotted using Page Rank algorithm.
- Understand the importance of packages in any programming language : Page Rank algorithm can also be used to understand the layers of packages used in languages like R and Python. We will take up this topic in our next article.
Thinkpot: Can you think of more usage of Page Rank algorithm? Share with us useful links to leverage Page Rank algorithm in various fields.
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