Spelling suggestions: "subject:"duplication elimination""
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Cache-Oblivious Searching and Sorting in MultisetsFarzan, Arash January 2004 (has links)
We study three problems related to searching and sorting in multisets in the cache-oblivious model: Finding the most frequent element (the mode), duplicate elimination and finally multi-sorting. We are interested in minimizing the cache complexity (or number of cache misses) of algorithms for these problems in the context under which the cache size and block size are unknown.
We start by showing the lower bounds in the comparison model. Then we present the lower bounds in the cache-aware model, which are also the lower bounds in the cache-oblivious model. We consider the input multiset of size <i>N</i> with multiplicities <i>N</i><sub>1</sub>,. . . , <i>N<sub>k</sub></i>. The lower bound for the cache complexity of determining the mode is Ω({<i>N</i> over <i>B</i>} log {<i>M</i> over <i>B</i>} {<i>N</i> over <i>fB</i>}) where ƒ is the frequency of the mode and <i>M</i>, <i>B</i> are the cache size and block size respectively. Cache complexities of duplicate removal and multi-sorting have lower bounds of Ω({<i>N</i> over <i>B</i>} log {<i>M</i> over <i>B</i>} {<i>N</i> over <i>B</i>} - £{<i>k</i> over <i>i</i>}=1{<i>N<sub>i</sub></i> over <i>B</i>}log {<i>M</i> over <i>B</i>} {<i>N<sub>i</sub></i> over <i>B</i>}).
We present two deterministic approaches to give algorithms: selection and distribution. The algorithms with these deterministic approaches differ from the lower bounds by at most an additive term of {<i>N</i> over <i>B</i>} loglog <i>M</i>. However, since loglog <i>M</i> is very small in real applications, the gap is tiny. Nevertheless, the ideas of our deterministic algorithms can be used to design cache-aware algorithms for these problems. The algorithms turn out to be simpler than the previously-known cache-aware algorithms for these problems.
Another approach to design algorithms for these problems is the probabilistic approach. In contrast to the deterministic algorithms, our randomized cache-oblivious algorithms are all optimal and their cache complexities exactly match the lower bounds.
All of our algorithms are within a constant factor of optimal in terms of the number of comparisons they perform.
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Cache-Oblivious Searching and Sorting in MultisetsFarzan, Arash January 2004 (has links)
We study three problems related to searching and sorting in multisets in the cache-oblivious model: Finding the most frequent element (the mode), duplicate elimination and finally multi-sorting. We are interested in minimizing the cache complexity (or number of cache misses) of algorithms for these problems in the context under which the cache size and block size are unknown.
We start by showing the lower bounds in the comparison model. Then we present the lower bounds in the cache-aware model, which are also the lower bounds in the cache-oblivious model. We consider the input multiset of size <i>N</i> with multiplicities <i>N</i><sub>1</sub>,. . . , <i>N<sub>k</sub></i>. The lower bound for the cache complexity of determining the mode is Ω({<i>N</i> over <i>B</i>} log {<i>M</i> over <i>B</i>} {<i>N</i> over <i>fB</i>}) where ƒ is the frequency of the mode and <i>M</i>, <i>B</i> are the cache size and block size respectively. Cache complexities of duplicate removal and multi-sorting have lower bounds of Ω({<i>N</i> over <i>B</i>} log {<i>M</i> over <i>B</i>} {<i>N</i> over <i>B</i>} - £{<i>k</i> over <i>i</i>}=1{<i>N<sub>i</sub></i> over <i>B</i>}log {<i>M</i> over <i>B</i>} {<i>N<sub>i</sub></i> over <i>B</i>}).
We present two deterministic approaches to give algorithms: selection and distribution. The algorithms with these deterministic approaches differ from the lower bounds by at most an additive term of {<i>N</i> over <i>B</i>} loglog <i>M</i>. However, since loglog <i>M</i> is very small in real applications, the gap is tiny. Nevertheless, the ideas of our deterministic algorithms can be used to design cache-aware algorithms for these problems. The algorithms turn out to be simpler than the previously-known cache-aware algorithms for these problems.
Another approach to design algorithms for these problems is the probabilistic approach. In contrast to the deterministic algorithms, our randomized cache-oblivious algorithms are all optimal and their cache complexities exactly match the lower bounds.
All of our algorithms are within a constant factor of optimal in terms of the number of comparisons they perform.
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Modeling and Querying Uncertainty in Data CleaningBeskales, George January 2012 (has links)
Data quality problems such as duplicate records, missing values, and violation of integrity constrains frequently appear in real world applications. Such problems cost enterprises billions of dollars annually, and might have unpredictable consequences in mission-critical tasks. The process of data cleaning refers to detecting and correcting errors in data in order to improve the data quality. Numerous efforts have been taken towards improving the effectiveness and the efficiency of the data cleaning.
A major challenge in the data cleaning process is the inherent uncertainty about the cleaning decisions that should be taken by the cleaning algorithms (e.g., deciding whether two records are duplicates or not). Existing data cleaning systems deal with the uncertainty in data cleaning decisions by selecting one alternative, based on some heuristics, while discarding (i.e., destroying) all other alternatives, which results in a false sense of certainty. Furthermore, because of the complex dependencies among cleaning decisions, it is difficult to reverse the process of destroying some alternatives (e.g., when new external information becomes available). In most cases, restarting the data cleaning from scratch is inevitable whenever we need to incorporate new evidence.
To address the uncertainty in the data cleaning process, we propose a new approach, called probabilistic data cleaning, that views data cleaning as a random process whose possible outcomes are possible clean instances (i.e., repairs). Our approach generates multiple possible clean instances to avoid the destructive aspect of current cleaning systems. In this dissertation, we apply this approach in the context of two prominent data cleaning problems: duplicate elimination, and repairing violations of functional dependencies (FDs).
First, we propose a probabilistic cleaning approach for the problem of duplicate elimination. We define a space of possible repairs that can be efficiently generated. To achieve this goal, we concentrate on a family of duplicate detection approaches that are based on parameterized hierarchical clustering algorithms. We propose a novel probabilistic data model that compactly encodes the defined space of possible repairs. We show how to efficiently answer relational queries using the set of possible repairs. We also define new types of queries that reason about the uncertainty in the duplicate elimination process.
Second, in the context of repairing violations of FDs, we propose a novel data cleaning approach that allows sampling from a space of possible repairs. Initially, we contrast the existing definitions of possible repairs, and we propose a new definition of possible repairs that can be sampled efficiently. We present an algorithm that randomly samples from this space, and we present multiple optimizations to improve the performance of the sampling algorithm.
Third, we show how to apply our probabilistic data cleaning approach in scenarios where both data and FDs are unclean (e.g., due to data evolution or inaccurate understanding of the data semantics). We propose a framework that simultaneously modifies the data and the FDs while satisfying multiple objectives, such as consistency of the resulting data with respect to the resulting FDs, (approximate) minimality of changes of data and FDs, and leveraging the trade-off between trusting the data and trusting the FDs. In presence of uncertainty in the relative trust in data versus FDs, we show how to extend our cleaning algorithm to efficiently generate multiple possible repairs, each of which corresponds to a different level of relative trust.
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Modeling and Querying Uncertainty in Data CleaningBeskales, George January 2012 (has links)
Data quality problems such as duplicate records, missing values, and violation of integrity constrains frequently appear in real world applications. Such problems cost enterprises billions of dollars annually, and might have unpredictable consequences in mission-critical tasks. The process of data cleaning refers to detecting and correcting errors in data in order to improve the data quality. Numerous efforts have been taken towards improving the effectiveness and the efficiency of the data cleaning.
A major challenge in the data cleaning process is the inherent uncertainty about the cleaning decisions that should be taken by the cleaning algorithms (e.g., deciding whether two records are duplicates or not). Existing data cleaning systems deal with the uncertainty in data cleaning decisions by selecting one alternative, based on some heuristics, while discarding (i.e., destroying) all other alternatives, which results in a false sense of certainty. Furthermore, because of the complex dependencies among cleaning decisions, it is difficult to reverse the process of destroying some alternatives (e.g., when new external information becomes available). In most cases, restarting the data cleaning from scratch is inevitable whenever we need to incorporate new evidence.
To address the uncertainty in the data cleaning process, we propose a new approach, called probabilistic data cleaning, that views data cleaning as a random process whose possible outcomes are possible clean instances (i.e., repairs). Our approach generates multiple possible clean instances to avoid the destructive aspect of current cleaning systems. In this dissertation, we apply this approach in the context of two prominent data cleaning problems: duplicate elimination, and repairing violations of functional dependencies (FDs).
First, we propose a probabilistic cleaning approach for the problem of duplicate elimination. We define a space of possible repairs that can be efficiently generated. To achieve this goal, we concentrate on a family of duplicate detection approaches that are based on parameterized hierarchical clustering algorithms. We propose a novel probabilistic data model that compactly encodes the defined space of possible repairs. We show how to efficiently answer relational queries using the set of possible repairs. We also define new types of queries that reason about the uncertainty in the duplicate elimination process.
Second, in the context of repairing violations of FDs, we propose a novel data cleaning approach that allows sampling from a space of possible repairs. Initially, we contrast the existing definitions of possible repairs, and we propose a new definition of possible repairs that can be sampled efficiently. We present an algorithm that randomly samples from this space, and we present multiple optimizations to improve the performance of the sampling algorithm.
Third, we show how to apply our probabilistic data cleaning approach in scenarios where both data and FDs are unclean (e.g., due to data evolution or inaccurate understanding of the data semantics). We propose a framework that simultaneously modifies the data and the FDs while satisfying multiple objectives, such as consistency of the resulting data with respect to the resulting FDs, (approximate) minimality of changes of data and FDs, and leveraging the trade-off between trusting the data and trusting the FDs. In presence of uncertainty in the relative trust in data versus FDs, we show how to extend our cleaning algorithm to efficiently generate multiple possible repairs, each of which corresponds to a different level of relative trust.
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