google 搜索与 inter 网的信息检索 马志明 may 16, 2008 email: mazm@amt.ac.cn
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Google搜索与Inter网的信息检索
马志明
May 16, 2008
Email: mazm@amt.ac.cn http://www.amt.ac.cn/member/mazhiming/index.html
约有 626,000 项符合中国科学院数学与系统科学研究院的查询结果,
以下是第 1-100 项。( 搜索用时 0.45 秒)
How can google make a ranking of 626,000 pages
in 0.45 seconds?
A main task of Internet (Web)
Information Retrieval = Design and Analysis of
Search Engine (SE) Algorithm
involving plenty of Mathematics
HITS
PageRank
1998 Jon Kleinberg Cornell University
1998 Sergey Brin and Larry Page
Stanford University
Nevanlinna Prize ( 2006)Jon Kleinberg
• One of Kleinberg‘s most important research achievements focuses on the internetwork structure of the World Wide Web.
• Prior to Kleinberg‘s work, search engines focused only on the content of web pages , not on the link structure.
• Kleinberg introduced the idea of
• “authorities” and “hubs”: • An authority is a web page that contains information on a
particular topic, • and a hub is a page that contains links to many authorities.
Zhuzihu thesis.pdf
Page Rank, the ranking system used by the Google search engine.
• Query independent
• content independent.
• using only the web graph structure
PageRank as a Function of the Damping FactorPaolo Boldi Massimo Santini Sebastiano Vigna
DSI, Università degli Studi di Milano
WWW 2005 paper
3.1 Choosing the damping factor3 General Behaviour
3.2 Getting close to 1
can we somehow characterise the properties of ? what makes different from the other (infinitely many, if P is reducible) limit distributions of P?
)(lim1
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is the limit distribution of P when the starting
distribution is uniform, that is,
Conjecture 1 :
*
.lim)(lim1
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nP
N
1
Website provide plenty of information:
pages in the same website may share the same IP, run on the same web server and database server, and be authored / maintained by the same person or organization.
there might be high correlations between pages in the same website, in terms of content, page layout and hyperlinks.
websites contain higher density of hyperlinks inside them (about 75% ) and lower density of edges in between.
HostGraph loses much transition information
Can a surfer jump from page 5 of site 1 to a page in site 2 ?
From: s06-pc-chairs-email@u.washington.edu [mailto:s06-pc-chairs-Sent: 2006 年 4 月 4 日 8:36To: Tie-Yan Liu; wangying@amss.ac.cn; fengg03@mails.thu.edu.cn; ybao@amss.ac.cn; mazm@amt.ac.cnSubject: [SIGIR2006] Your Paper #191
Title: AggregateRank: Bring Order to Web Sites Congratulations!!
29th Annual International Conference on Research & Development on Information Retrieval (SIGIR’06, August 6–11, 2006, Seattle, Washington, USA).
Ranking Websites, a Probabilistic View
Ying Bao, Gang Feng, Tie-Yan Liu, Zhi-Ming Ma, and Ying Wang
Internet Mathematics, Volume 3 (2007), Issue 3
- --- We suggest evaluating the importance of a website with the mean frequency of visiting the website for the Markov chain on the Internet Graph describing random surfing.
---We show that this mean frequency is equal to the sum of the PageRanks of all the webpages in that website (hence is referred as PageRankSum )
---We propose a novel algorithm (AggregateRank Algorithm) based on the theory of stochastic complement to calculate the rank of a website.
---The AggregateRank Algorithm can approximate the PageRankSum accurately, while the corresponding computational complexity is much lower than PageRankSum
--- By constructing return-time Markov chains restricted to each website, we describe also the probabilistic relation between PageRank and AggregateRank.
---The complexity and the error bound of AggregateRank Algorithm with experiments of real dada are discussed at the end of the paper.
The stationary distribution, known as the PageRank vector, is given by
We may rewrite the stationary distribution as
with as a row vector of length in
We define the one-step transition probability from the website to the website by
where e is an dimensional column vector of all ones
jn
iSjS
The N×N matrix C(α)=(cij(α)) is referred to as the
coupling matrix, whose elements represent the transition probabilities between websites. It can be proved that C(α) is an irreducible stochastic matrix, so that it possesses a unique stationary probability vector. We use ξ(α) to denote this stationary probability, which can be gotten from
with 1C e
with 1C e
Since
One can easily check that
is the unique solution to
We shall refer as the AggregateRank
That is, the probability of visiting a website is equal to the sum of PageRanks of all the pages in that website. This conclusion is consistent to our intuition.
the transition probability from Si to Sj actually
summarizes all the cases that the random surfer jumps from any page in Si to any page in Sj within
one-step transition. Therefore, the transition in this new HostGraph is in accordance with the real behavior of the Web surfers. In this regard, the so-calculated rank from the coupling matrix C(α) will be more reasonable than those previous works.
Assume a starting state in website A, i.e.
It is clear that all the variables are stopping times for X.
We define
and inductively
• Based on the above discussions, the direct approach of computing the AggregateRank ξ(α) is to accumulate PageRank values (denoted by PageRankSum).
• However, this approach is unfeasible because the computation of PageRank is not a trivial task when the number of web pages is as large as several billions. Therefore,
Efficient computation becomes a significant problem .
1. Divide the n × n matrix into
N × N blocks according to the N sites.
AggregateRank
2. Construct the stochastic matrix for by changing the diagonal elements of to make each raw sum up to 1.
3. Determine from
4. Form an approximation to the coupling matrix , by evaluating
5. Determine the stationary distribution of and denote it , i.e.,
Experiments
• In our experiments, the data corpus is the benchmark data for the Web track of TREC 2003 and 2004, which was crawled from the .gov domain in the year of 2002.
• It contains 1,247,753 webpages in total.
we get 731 sites in the .gov dataset. The largest website contains 137,103 web pages while the smallest one contains only 1 page.
• From: pcchairs@sigir2008.confmaster.net Sent: Thursday, April 03, 2008 9:48 AMDear Yuting Liu, Bin Gao, Tie-Yan Liu, Ying Zhang,
• Zhiming Ma, Shuyuan He, Hang Li
• We are pleased to inform you that your paperTitle: BrowseRank: Letting Web Users Vote for Page Importancehas been accepted for oral presentation as a full paper and for publication as an eight-page paper in the proceedings of
• the 31st Annual International ACM SIGIR Conference on Research & Development on Information
Retrieval.
Congratulations!!
Building model• Properties of Q process:
– Stationary distribution:•
– Jumping probability: •
– Embedded Markov chain:• is a Markov chain with the transition probability
matrix
( )P t
Main conclusion 1 •
– is the mean of the staying time on page i.
The more important a page is, the longer staying time on it is.
– is the mean of the first re-visit time at page i. The more important a page is, the smaller the
re-visit time is, and the larger the visit frequency is.
Main conclusion 2
•
– is the stationary distribution of – The stationary distribution of discrete model is
easy to compute• Power method for
• Log data for
Further questions
• How about inhomogenous process?– Statistic result show: different period of time
possesses different visiting frequency.– Poisson processes with different intensity.
• Marked point process– Hyperlink is not reliable.– Users’ real behavior should be considered.
Relevance Ranking• Many features for measuring relevance
– Term distribution (anchor, URL, title, body, proximity, ….)
– Recommendation & citation (PageRank, click-through data, …)
– Statistics or knowledge extracted from web data
• Questions– What is the optimal ranking function to combine
different features (or evidences)?
– How to measure relevance?
Learning to Rank
• What is the optimal weightings for combining the various features– Use machine learning methods to learn the ranking
function
– Human relevance system (HRS)
– Relevance verification tests (RVT)
Wei-Ying Ma, Microsoft Research Asia
Learning to Rank
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66Wei-Ying Ma, Microsoft Research Asia
Learning to Rank (Cont)
• State-of-the-art algorithms for learning to rank take the pairwise approach– Ranking SVM– RankBoost– RankNet (employed at Live Search)
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Wei-Ying Ma, Microsoft Research Asia
learning to rank
• The goal of learning to rank is to construct a real-valued function that can generate a ranking on the documents associated with the given query. The state-of-the-art methods transforms the learning problem into that of classification and then performs the learning task:
• For each query, it is assumed that there are two categories of documents: positive and negative (representing relevant and irreverent with respect to the query). Then document pairs are constructed between positive documents and negative documents. In the training process, the query information is actually ignored.
[5] Y. Cao, J. Xu, T.-Y. Liu, H. Li, Y. Huang, and H.-W. Hon.
Adapting ranking svm to document retrieval. In Proc. of SIGIR’06, pages 186–193, 2006.
[11] T. Qin, T.-Y. Liu, M.-F. Tsai, X.-D. Zhang, and H. Li.
Learning to search web pages with query-level loss functions. Technical Report MSR-TR-2006-156, 2006.
As case studies, we investigate Ranking SVM and RankBoost. We show that after introducing query-level normalization to its objective function, Ranking SVM will have query-level stability.
For RankBoost, the query-level stability can be achieved if we introduce both query-level normalization and regularization to its objective function.
• We re-represent the learning to rank problem by introducing the concept of
• ‘query’ and ‘distribution given query’ • into its mathematical formulation. • More precisely, we assume that queries are drawn
independently from a query space Q according to an (unknown) probability distribution
It should be noted that if , then the bound makes sense. This condition can be satisfied in many practical cases.
As case studies, we investigate Ranking SVM and RankBoost. We show that after introducing query-level normalization to its objective function, Ranking SVM will have query-level stability.
For RankBoost, the query-level stability can be achieved if we introduce both query-level normalization and regularization to its objective function.
These analyses agree largely with our experiments and the experiments in [5] and [11].
Rank aggregation
• Rank aggregation is to combine ranking results of entities from multiple ranking functions in order to generate a better one. The individual ranking functions are referred to as base rankers, or simply rankers.
Score-based aggregation
• Rank aggregation can be classified into two categories [2]. In the first category, the entities in individual ranking lists are assigned scores and the rank aggregation function is assumed to use the scores (denoted as score-based aggregation) [11][18][28].
order-based aggregation
• In the second category, only the orders of the entities in individual ranking lists are used by the aggregation function (denoted as order-based aggregation). Order-based aggregation is employed at meta-search,
for example, in which only order (rank) information from individual search engines is available.
• Previously order-based aggregation was mainly addressed with the unsupervised learning approach, in the sense that no training data is utilized; methods like
• Borda Count [2][7][27], • median rank aggregation [9], • genetic algorithm [4], • fuzzy logic based rank aggregation [1],• Markov Chain based rank aggregation [7] and so on were proposed.
It turns out that the optimization problems for the Markov Chain based methods are hard, because they are not convex optimization problems. We are able to develop a method for the optimization of one Markov Chain based method, called Supervised MC2.We prove that we can transform the optimizationproblem into that of Semidefinite Programming. As a result, we can efficiently solve the issue.
Next Generation Web Search ?(Web Search 2.0 --> 3.0)
• Directions for new innovations– Process-centric vs. data-centric
– Infrastructure for Web-scale data mining
– Intelligence & knowledge discovery
Wei-Ying Ma, Microsoft Research Asia
Web Search –
Past, Present, and Future
Wei-Ying MaWeb Search and Mining Group
Microsoft Research AsiaWeb Search - Past Present and Future - public.ppt
next generation.ppt
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