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KDD
2005
ACM
2005
ACM
Wavelet synopsis for data streams: minimizing non-euclidean error
We consider the wavelet synopsis construction problem for data streams where given n numbers we wish to estimate the data by constructing a synopsis, whose size, say B is much smaller than n. The B numbers are chosen to minimize a suitable error between the original data and the estimate derived from the synopsis. Several good one-pass wavelet construction streaming algorithms minimizing the 2 error exist. For other error measures, the problem is less understood. We provide the first one-pass small space streaming algorithms with provable error guarantees (additive approximation) for minimizing a variety of non-Euclidean error measures including all weighted p (including ) and relative error p metrics. In several previous works solutions (for weighted 2, and maximum relative error) where the B synopsis coefficients are restricted to be wavelet coefficients of the data were proposed. This restriction yields suboptimal solutions on even fairly simple examples. Other lines of research, s...
Real-time TrafficData Mining | KDD 2005 | Maximum Relative Error | Non-Euclidean Error Measures | Provable Error Guarantees |
| Added | 30 Nov 2009 |
| Updated | 30 Nov 2009 |
| Type | Conference |
| Year | 2005 |
| Where | KDD |
| Authors | Sudipto Guha, Boulos Harb |
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