scholarly journals Randomized algorithm for the sum selection problem

2007 ◽  
Vol 377 (1-3) ◽  
pp. 151-156 ◽  
Author(s):  
Tien-Ching Lin ◽  
D.T. Lee
Keyword(s):  
Randomized Algorithm ◽  
Selection Problem

scholarly journals Approximate Minimum Selection with Unreliable Comparisons

Algorithmica ◽  
2021 ◽  
Author(s):  
Stefano Leucci ◽  
Chih-Hung Liu
Keyword(s):  
Success Probability ◽  
Randomized Algorithm ◽  
Selection Problem ◽  
Pairwise Comparisons ◽  
Small Probability ◽  
Expected Number ◽  
Worst Case ◽  
Asymptotically Optimal

AbstractWe consider the approximate minimum selection problem in presence of independent random comparison faults. This problem asks to select one of the smallest k elements in a linearly-ordered collection of n elements by only performing unreliable pairwise comparisons: whenever two elements are compared, there is a small probability that the wrong comparison outcome is observed. We design a randomized algorithm that solves this problem with a success probability of at least $$1-q$$ 1 - q for $$q \in (0, \frac{n-k}{n})$$ q ∈ ( 0 , n - k n ) and any $$k \in [1, n-1]$$ k ∈ [ 1 , n - 1 ] using $$O\big ( \frac{n}{k} \big \lceil \log \frac{1}{q} \big \rceil \big )$$ O ( n k ⌈ log 1 q ⌉ ) comparisons in expectation (if $$k \ge n$$ k ≥ n or $$q \ge \frac{n-k}{n}$$ q ≥ n - k n the problem becomes trivial). Then, we prove that the expected number of comparisons needed by any algorithm that succeeds with probability at least $$1-q$$ 1 - q must be $${\varOmega }(\frac{n}{k}\log \frac{1}{q})$$ Ω ( n k log 1 q ) whenever q is bounded away from $$\frac{n-k}{n}$$ n - k n , thus implying that the expected number of comparisons performed by our algorithm is asymptotically optimal in this range. Moreover, we show that the approximate minimum selection problem can be solved using $$O( (\frac{n}{k} + \log \log \frac{1}{q}) \log \frac{1}{q})$$ O ( ( n k + log log 1 q ) log 1 q ) comparisons in the worst case, which is optimal when q is bounded away from $$\frac{n-k}{n}$$ n - k n and $$k = O\big ( \frac{n}{\log \log \frac{1}{q}}\big )$$ k = O ( n log log 1 q ) .

SPEEDING UP MATERIALIZED VIEW SELECTION IN DATA WAREHOUSES USING A RANDOMIZED ALGORITHM

2001 ◽  
Vol 10 (03) ◽  
pp. 327-353 ◽  
Author(s):  
MINSOO LEE ◽  
JOACHIM HAMMER
Keyword(s):  
Randomized Algorithm ◽  
Linear Increase ◽  
Selection Problem ◽  
Maintenance Cost ◽  
Materialized Views ◽  
Dramatic Improvement ◽  
Heterogeneous Information ◽  
View Selection ◽  
Heterogeneous Information Sources ◽  
Materialized View Selection

A data warehouse stores information that is collected from multiple, heterogeneous information sources for the purpose of complex querying and analysis. Information in the warehouse is typically stored in the form of materialized views, which represent pre-computed portions of frequently asked queries. One of the most important tasks when designing a warehouse is the selection of materialized views to be maintained in the warehouse. The goal is to select a set of views in such a way as to minimize the total query response time over all queries, given a limited amount of time for maintaining the views (maintenance-cost view selection problem). In this paper, we propose an efficient solution to the maintenance-cost view selection problem using a genetic algorithm for computing a near-optimal set of views. Specifically, we explore the maintenance-cost view selection problem in the context of OR view graphs. We show that our approach represents a dramatic improvement in time complexity over existing search-based approaches using heuristics. Our analysis shows that the algorithm consistently yields a solution that lies within 10% of the optimal query benefit while at the same time exhibiting only a linear increase in execution time. We have implemented a prototype version of our algorithm which is used to simulate the measurements used in the analysis of our approach.

A DOWNSIDE RISK APPROACH FOR THE PORTFOLIO SELECTION PROBLEM WITH FUZZY RETURNS

2004 ◽  
Vol 09 (01) ◽  
Author(s):  
Teresa León ◽  
Vicente Liern ◽  
Paulina Marco ◽  
Enriqueta Vercher ◽  
José Vicente Segura
Keyword(s):  
Portfolio Selection ◽  
Downside Risk ◽  
Selection Problem ◽  
Portfolio Selection Problem ◽  
Risk Approach

Approximation Algorithms for Submodular Data Summarization with a Knapsack Constraint

2021 ◽  
Vol 5 (1) ◽  
pp. 1-31
Author(s):  
Kai Han ◽  
Shuang Cui ◽  
Tianshuai Zhu ◽  
Enpei Zhang ◽  
Benwei Wu ◽  
...  
Keyword(s):  
Approximation Algorithms ◽  
Fundamental Problem ◽  
Randomized Algorithm ◽  
Deterministic Algorithm ◽  
Submodular Function ◽  
Approximation Ratio ◽  
Performance Bounds ◽  
Data Summarization ◽  
Submodular Optimization ◽  
Knapsack Constraint

Data summarization, i.e., selecting representative subsets of manageable size out of massive data, is often modeled as a submodular optimization problem. Although there exist extensive algorithms for submodular optimization, many of them incur large computational overheads and hence are not suitable for mining big data. In this work, we consider the fundamental problem of (non-monotone) submodular function maximization with a knapsack constraint, and propose simple yet effective and efficient algorithms for it. Specifically, we propose a deterministic algorithm with approximation ratio 6 and a randomized algorithm with approximation ratio 4, and show that both of them can be accelerated to achieve nearly linear running time at the cost of weakening the approximation ratio by an additive factor of ε. We then consider a more restrictive setting without full access to the whole dataset, and propose streaming algorithms with approximation ratios of 8+ε and 6+ε that make one pass and two passes over the data stream, respectively. As a by-product, we also propose a two-pass streaming algorithm with an approximation ratio of 2+ε when the considered submodular function is monotone. To the best of our knowledge, our algorithms achieve the best performance bounds compared to the state-of-the-art approximation algorithms with efficient implementation for the same problem. Finally, we evaluate our algorithms in two concrete submodular data summarization applications for revenue maximization in social networks and image summarization, and the empirical results show that our algorithms outperform the existing ones in terms of both effectiveness and efficiency.

On Laplacian energy of picture fuzzy graphs in site selection problem

2021 ◽  
pp. 1-18
Author(s):  
Mahima Poonia ◽  
Rakesh Kumar Bajaj
Keyword(s):  
Decision Making ◽  
Site Selection ◽  
Upper Bounds ◽  
Selection Problem ◽  
Hydropower Plant ◽  
Fuzzy Graph ◽  
Fuzzy Information ◽  
Fuzzy Graphs ◽  
Laplacian Energy ◽  
Selection For

In the present work, the adjacency matrix, the energy and the Laplacian energy for a picture fuzzy graph/directed graph have been introduced along with their lower and the upper bounds. Further, in the selection problem of decision making, a methodology for the ranking of the available alternatives has been presented by utilizing the picture fuzzy graph and its energy/Laplacian energy. For the shake of demonstrating the implementation of the introduced methodology, the task of site selection for the hydropower plant has been carried out as an application. The originality of the introduced approach, comparative remarks, advantageous features and limitations have also been studied in contrast with intuitionistic fuzzy and Pythagorean fuzzy information.

Sign in / Sign up

Export Citation Format

Share Document