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Probabilistic Skyline Operator over Sliding Windows

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Xuemin Lin, Ying Zhang, Wei Wang (UNSW & NICTA) Jeffrey Xu Yu (CUHK) Outline. Background ... Elements continuously arrive with occurrence probabilities ... – PowerPoint PPT presentation

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Title: Probabilistic Skyline Operator over Sliding Windows

1

Probabilistic Skyline Operator over Sliding
Windows

Wenjie Zhang University of New South Wales
NICTA, Australia
Joint work Xuemin Lin, Ying Zhang, Wei Wang
(UNSW NICTA) Jeffrey Xu Yu (CUHK)
2
Outline

Background
Framework
Algorithms
Experiment
Conclusion

3
Background
2
0.1
1
1
0.1
4
0.8
6
0.5
3
0.4
5
0.1

Elements continuously arrive with occurrence
probabilities

Problem How to continuously compute skylines in
a sliding window with size N (elements)?

Sliding window N 5

4
Background

Multi-criteria decision making regarding
uncertain data
Online auction
Financial market

5
Related work

Probabilistic skyline (VLDB07)
Probabilistic reverse skyline (SIGMOD08)
Probabilistic aggregates and sketches over
uncertain streams (SIGMOD07, SODA07, PODS07)
Frequent items on uncertain streams (SIGMOD08)
Top-k queries over uncertain sliding window
(VLDB08)

Probabilistic skyline computation
Uncertain stream processing
6
Models and Problem Definition

Model DS is a stream of elements, each element a
is in a d-dimensional space and with an
occurrence probability P(a) ( in (0, 1)
The skyline probability of an element a is
Problem Definition retrieving elements from the
most recent N elements, with skyline probability
no less than a given threshold q

7
Challenges and Contributions

Space efficiency
Contribution Space reduction O(N) to O(lnd-1N)
Time efficiency
Contribution R-tree based efficient incremental
algorithms

8
Outline

Background and Preliminaries
Framework
Algorithms
Experiment
Conclusion

9
Framework what to keep ?
Pold (2) 1 P(1)
2
0.1
0.1
1
Pnew(2) (1 P(3)) (1 P(4))
4
0.8
3
0.4
Pnew (2) lt q , element 2 will never become
skyline in the window
5
0.1

window size N 5 probability threshold 0.5

10
Framework what to keep ?

Candidate set SN,q
Correctness
(1) no missing skyline points
(2) no false hits to determine SN, q
(3) no false positive to determine skyline
results
(4) no false negative to determine skyline
results
--- probability based on SN,q may not be
accurate, but
satisfies the threshold
requirement.

11
Framework

Space required for SN,q
SN,q is the minimum information to be maintained
to get a correct answer.

Psky(3) 0.9 (1 0.4) (1- 0.3) lt q
Psky(3) 0.9 gt q
3
0.9
0.4
2
2
0.3
1
1
4
0.8
window size N 4 probability threshold q 0.5
12
Space of Candidate Set

Theorem Candidate Set requires a
poly-logarithmic space on average case regarding
uniform distributions, O(f(q)lnd-1N).

13
Outline

Background and Preliminaries
Framework
Algorithms
Experiment
Conclusion

14
Algorithms

We maintain two R-trees
R1 SKYN,q --- skylines
R2 SN,q - SKYN,q --- candidates skylines

15
Algorithms
R1 SKYN,q
not in SN,q
1(.1)
6(.8)
8(.2)
5(.8)
10(.2)
7(.6)
3(.4)
9(.5)
11(.6)
R2 SN,q SKYN,q
13(.1)
12(.1)
2(.1)
4(.1)

window size N 13 probability threshold q 0.2

16
Algorithms

New element arrives
Check Psky Pnew on R1
Check Pnew on R2
Handling elements with Pnew lt q
Old element expires
Update Pold
Check Psky on R2

17
Algorithms new elements arrives
R1 SKYN,q
Delete an Entry
6(.8)
8(.2)
5(.8)
Before update Pnew (1, 1) Psky (0.8,
0.8) global Pnew 1 0.2 After update global
Pnew 1- 0.8 Delete from R1
10(.2)
7(.6)
3(.4)
9(.5)
11(.6)
R2 SN,q - SKYN,q
13(.1)
12(.1)
2(.1)
4(.1)
14(0.8)

window size N 13 probability threshold q 0.2

18
Algorithms new elements arrives
Move an Entry from R1 to R2
R1 SKYN,q
8(.2)
Before update Pnew (1, 1) Psky (0.24,
0.6) global Pnew 1 After update global Pnew
1 0.8 min Pnew 0.2 q max Psky 0.12 lt
q Move from R1 to R2
10(.2)
7(.6)
3(.4)
9(.5)
11(.6)
R2 SN,q - SKYN,q
13(.1)
12(.1)
2(.1)
4(.1)
14(0.8)

window size N 13 probability threshold q 0.2

19
Algorithms new elements arrives
R1 SKYN,q
8(.2)
R2 SN,q - SKYN,q
10(.2)
Before update Pnew (0.9, 1) global Pnew
1 After update global Pnew 1 0.8 min Pnew
lt q max Pnew q Drill down and delete 2
7(.6)
3(.4)
9(.5)
11(.6)
13(.1)
12(.1)
2(.1)
4(.1)
14(0.8)

window size N 13 probability threshold q 0.2

20
Algorithms new elements arrives
R1 SKYN,q
8(.2)
R2 SN,q - SKYN,q
10(.2)
Update Pold
7(.6)
3(.4)
Update Pold of 12 13 global Pold / (1 0.1)
9(.5)
11(.6)
13(.1)
12(.1)
2(.1)
4(.1)
14(0.8)

window size N 13 probability threshold q 0.2

21
Algorithms new elements arrives
R1 SKYN,q
8(.2)
R2 SN,q - SKYN,q
10(.2)
7(.6)
Insert new element Pnew 1. compute Psky
3(.4)
9(.5)
11(.6)
13(.1)
12(.1)
4(.1)
14(0.8)

window size N 13 probability threshold q 0.2

22
Algorithm old element expires

Delete it from R1 or R2.
Update Pold of remaining elements
Record global Pold on intermediate entries fully
dominated by it
Check Psky after update

23
Algorithms old element expires
R1 SKYN,q
8(.2)
Pold (7) / 1 P(3)
10(.2)
R2 SKYN,q
7(.6)
3(.4)
9(.5)
11(.6)
13(.1)
12(.1)
4(.1)
global Pold / 1 P(4)
14(0.8)

window size N 13 probability threshold q 0.2

24
Algorithms handling multiple thresholds

Continuous queries
Users specify k probability thresholds q1, , qk.
(qi lt qi-1)
Solution instead of maintaining R1, we maintain
R1, , Rk, each corresponding to a confidence
value.
Ad-hoc queries
Users issue a query retrieve skylines with
probability at least q (q qk)
Solution find an Ri with qi q lt qi-1. Then
all elements in Rj j lt i -1 are results. We
search Ri-1 to output qualified skylines

25
Experiment

Data set
Real stock transactions. 2-d. probability
assigned randomly. Size 2 million
Synthetic spatial location (independent or
anti-correlated) probability (uniform or
normal) 2d to 5d 2 million
Default values p 0.3 d 3 N 1M spatial
distribution anti-correlated probability
uniform

26
Experiment space