1 Algorithms for Large Data Sets Ziv Bar-Yossef Lecture 7 April 20, 2005 .
-
date post
19-Dec-2015 -
Category
Documents
-
view
219 -
download
0
Transcript of 1 Algorithms for Large Data Sets Ziv Bar-Yossef Lecture 7 April 20, 2005 .
1
Algorithms for Large Data Sets
Ziv Bar-YossefLecture 7
April 20, 2005
http://www.ee.technion.ac.il/courses/049011
2
Rank Aggregation
3
Outline
The rank aggregation problem Applications Desired properties Arrow’s impossibility theorem Rank aggregation methods
4
The Rank Aggregation Problem
m candidates (a.k.a. “alternatives”) M = {1,…,m}: set of candidates
n voters (a.k.a. “agents” or “judges”) N = {1,…,n}: set of voters
Each voter i, has an ranking i on M i(a) < i(b) means i-th voter prefers a to b Ranking may be a total or partial order
The rank aggregation problem:Combine 1,…,n into a single ranking on M, which represents the “social choice” of the voters. Rank aggregation function: f(1,…,n) = may be a total or partial order
5
Examples
m small, n large: elections (multi-party parliament, academies, boards,...)
m modest, n small: program committees, sports
m large, n small: meta-search, travel plans, restaurant selection
6
Applications to Web Search
Meta search Combine results of different search engines into a better overall
ranking Combat spam
Spam results unlikely to rank high in aggregate ranking, even though they can rank high in one or two search engines.
Search for multiple terms AND: bad recall OR: bad precision Complex boolean queries: too complicated for average user Solution: search for small subsets of terms and aggregate results
Combine multiple ranking functions Use different ranking functions (e.g., VSM, PageRank, HITS, …)
and aggregate them into a single function
7
Applications to Databases
Rank items in a database according to multiple criteriaEx: Choose a restaurant by cuisine, distance,
price, quality, etc.Ex: Choose a flight ticket by price, # of stops,
date and time, frequent flier bonuses, etc.
8
Desired Properties: Unanimity
Unanimity (a.k.a. Pareto optimality):
If all voters prefer candidate a to candidate b (i.e., i(a) < i(b) for all i), then also should prefer a to b (i.e., (a) < (b)).
aca
bac
cbb
a:b = 3:0
9
Desired Properties: Condorcet Condorcet Criterion [Condorcet, 1785]:
Condorcet winner: a candidate a, which is preferred by most voters to any other candidate b (i.e., for all b, # of i s.t. i(a) < i(b) is at least n/2).
Condorcet criterion: If Condorcet winner exists, should rank it first (i.e., (a) = 1).
abc
baa
ccb
a:b = 2:1, a:c = 2:1
abc
bca
cab
No Condorcet winner
10
Desired Properties: XCC Extended Condorcet Criterion (XCC):
If most voters prefer candidate a to candidate b (i.e., # of i s.t. i(a) < i(b) is at least n/2), then also should prefer a to b (i.e., (a) < (b)).
Not always realizable
abc
baa
ccb
a) < (b) < (c)
abc
bca
cab
Not realizable
11
XCC and Spam [Dwork et al. 2001]
Definition: a page p is said “spam” to a ranking , if there is a page q ranked lower than p, which most human evaluators will think should be ranked higher than p.
Assumption: for any two pages p,q, majority of human evaluators agrees with majority of search engine rankings on the order of p,q.
Conclusion: Spam pages are always “Condorcet losers” If rank aggregation function respects XCC, it eliminates
spam.
12
Desired Properties: Independence from Irrelevant Alternatives
Independence from Irrelevant Alternatives:
Relative order of a and b in should depend only on relative order of a and b in 1,…,n.Ex: if i = (a b c) changes to (a c b), relative
order of a,b in should not change.
13
Desired Properties: Neutrality and Anonymity
NeutralityNo candidate should be favored to others. If two candidates switch positions in 1,…,n, they
should switch positions also in .
AnonymityNo voter should be favored to others. If two voters switch their orderings, should remain
the same.
14
Desired Properties: Monotonicity and Consistency Monotonicity
If the ranking of a candidate is improved by a voter, its ranking in can only improve.
ConsistencyIf voters are split into two disjoint sets, S and T, and both the aggregation of voters in S and the aggregation of voters in T prefer a to b, then also the aggregation of all voters should prefer a to b.
15
Dictatorship and Democracy
Dictatorship: f(1,…,n) = i
Democracy (a.k.a. Majoritian aggregation):Use extended Condorcet Criterion to rank candidates.Always works for m = 2.Not always realizable for m ≥ 3.Theorem [May, 1952]: For m = 2, Democracy is
the only rank aggregation function which is monotone, neutral, and anonymous.
16
Arrow’s Impossibility Theorem [Arrow, 1951] Theorem: If m ≥ 3, then the only rank
aggregation function that is unanimous and independent from irrelevant alternatives is dictatorship.Won Nobel prize (1972)
17
Positional Rank Aggregation Methods Plurality
score(a) = # of voters who chose a as #1 : order candidates by decreasing scores
Top-k approval score(a) = # of voters who chose a as one of the top k : order candidates by decreasing scores
Borda’s rule [Borda, 1781] score(a) = i i(a) : order candidates by increasing scores
Violate independence from irrelevant alternatives
18
Positional Methods: Example
aacb
bdbd
ccdc
dbaa
PluralityTop-2 ApprovalBorda
a221+1+4+4=10
b132+4+2+1=9
c113+3+1+3=10
d024+2+3+2=11
19
Optimal Rank Aggregation
d: distance measure among rankings Definition: The optimal rank aggregation
for 1,…,n w.r.t. d is the ranking which minimizes i d(,i).
2
1n
20
Distance Measures
Kendall tau distance (a.k.a. “bubble sort distance”)K(,) = # of pairs of candidates (a,b) on which
and disagreeEx: K( (a b c d), (a d c b)) = 0 + 2 + 1 = 3
Spearman footrule distanceF(,) = a |(a) - (a)|Ex: F((a b c d), (a d c b)) = 0 + 2 + 0 + 2 = 4
21
Kemeny Optimal Aggregation[Kemeny 1959] Optimal aggregation w.r.t. Kendall-tau distance
Theorem [Young & Levenglick, 1978] [Truchon 1998]: Kemeny optimal aggregation is the only rank aggregation function, which is neutral, consistent, and satisfies the Extended Condorcet principle. Effective for fighting spam
Generative model: * is the “correct” ranking 1,…,n are generated from by swapping every pair with probability < ½. Then: Kemeny optimal aggregation gives the maximum likelihood given
1,…,n. [Young 1988]
22
Complexity of Kemeny Optimal Aggregation NP-hard, even for n = 4 [Dwork et al. 2001]
In P, for n = 2. Unknown for n = 3.
Can be approximated using Spearman footrule: Proposition [Diaconis-Graham]:
K(,) ≤ F(,) ≤ 2 K(,)
What is the complexity of footrule optimal aggregation?
23
Footrule Optimal Aggregation
Theorem [Dwork et al. 2001]Footrule optimal aggregation can be computed in polynomial time.
Proof Want to find which minimizes i a |(a) - i(a)| Define a weight bipartite graph G = (L,R,W) as follows:
L = M (the candidates) R = {1,…,m}: the available ranks W(a,r) = i |r - i(a)|
A matching in G = ranking Cost of a matching: i a |(a) - i(a)| Hence, reduced to finding a minimum cost matching in
a bipartite graph
24
Local Kemenization [Dwork et al. 2001] Definition: A ranking is locally Kemeny optimal
aggregation for 1,…,n if there is no other ranking ’, which: Can be obtained from by flipping one pair Satisfies i K(’, i) < i K(,i)
Features: Every Kemeny optimal aggregation is also locally
Kemeny optimal, but converse is not necessarily true. Locally Kemeny optimal aggregations satisfy XCC. Locally Kemeny optimal aggregations can be
computed in O(n m log m) time.
25
Markov Chain Techniques[Dwork et al. 2001] Markov Chain states = candidates Transitions depend on the voter rankings Basic idea: probabilistically switch to a
“better” candidate Final ranking: induced by stationary
distribution
26
Four MC Methods
Current state is candidate a. MC1: Choose uniformly from multiset of all candidates that
were ranked at least as high as a by some voter. Probability to stay at a: ~ average rank of a.
MC2: Choose a voter i u.a.r. and pick u.a.r. from among the candidates that the i-th voter ranked at least as high as a.
MC3: Choose a voter i u.a.r. and pick u.a.r. a candidate b. If i-th voter ranked b higher than a, go to b. Otherwise, stay in a.
MC4: Choose a candidate b u.a.r. If most voters ranked b higher than a, go to b. Otherwise, stay in a. Rank of a ~ # of “pairwise contests” a wins.
27
End of Lecture 7