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ICALP
2010
Springer
2010
Springer
Testing Non-uniform k-Wise Independent Distributions over Product Spaces
A discrete distribution D over Σ1 × · · · × Σn is called (non-uniform) k-wise independent if for any set of k indexes {i1, . . . , ik} and for any z1 ∈ Σi1 , . . . , zk ∈ Σik , PrX∼D[Xi1 · · · Xik = z1 · · · zk] = PrX∼D[Xi1 = z1] · · · PrX∼D[Xik = zk]. We study the problem of testing (non-uniform) k-wise independent distributions over product spaces. For the uniform case we show an upper bound on the distance between a distribution D from k-wise independent distributions in terms of the sum of Fourier coefficients of D at vectors of weight at most k. Such a bound was previously known only when the underlying domain is {0, 1}n . For the non-uniform case, we give a new characterization of distributions being k-wise independent and further show that such a characterization is robust based on our results for the uniform case. These greatly generalize the results of Alon et al. [1] on uniform k-wise independence over the Boolean cubes to non-uniform k-wise inde...
Real-time TrafficICALP 2010 | K-wise Independence | K-wise Independent Distributions | Programming Languages | Uniform Case |
| Added | 19 Jul 2010 |
| Updated | 19 Jul 2010 |
| Type | Conference |
| Year | 2010 |
| Where | ICALP |
| Authors | Ronitt Rubinfeld, Ning Xie |
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