We study the rate-distortion relationship in the set of permutations endowed with the Kendall Tau metric and the Chebyshev metric. Our study is motivated by the application of permutation rate-distortion to the average-case and worst-case analysis of algorithms for ranking with incomplete information and approximate sorting algorithms. For the Kendall Tau metric we provide bounds for small, medium, and large distortion regimes, while for the Chebyshev metric we present bounds that are valid for all distortions and are especially accurate for small distortions. In addition, for the Chebyshev metric, we provide a construction for covering codes
When examining the robustness of systems that take ranked lists as input, we can induce noise, measu...
We study the problem of learning probabilistic models for permutations, where the order between high...
We charactrize and investigate the highest achievable exponential growth rate of the expected number...
We study the rate-distortion relationship in the set of permutations endowed with the Kendall Tau me...
Abstract—We study the rate-distortion relationship in the set of permutations endowed with the Kenda...
We investigate the lossy compression of permutations by analyzing the trade-off between the size of ...
We investigate the lossy compression of the permutation space by analyzing the trade-off between the...
We investigate lossy compression (source coding) of data in the form of permutations. This problem h...
We consider the problem of approximate sorting of a data stream (in one pass) with limited internal ...
We consider the problem of approximate sorting of a data stream (in one pass) with limited internal ...
We examine the structure of families of distortion balls from the perspective of Kolmogorov complexi...
In this paper, we investigate the problem of compression of data that are in the form of permutation...
Abstract—Classical rate-distortion theory requires specifying a source distribution. Instead, we ana...
Classical rate-distortion theory requires specifying a source distribution. Instead, we analyze rate...
Abstract — Classical rate-distortion theory requires knowledge of an elusive source distribution. In...
When examining the robustness of systems that take ranked lists as input, we can induce noise, measu...
We study the problem of learning probabilistic models for permutations, where the order between high...
We charactrize and investigate the highest achievable exponential growth rate of the expected number...
We study the rate-distortion relationship in the set of permutations endowed with the Kendall Tau me...
Abstract—We study the rate-distortion relationship in the set of permutations endowed with the Kenda...
We investigate the lossy compression of permutations by analyzing the trade-off between the size of ...
We investigate the lossy compression of the permutation space by analyzing the trade-off between the...
We investigate lossy compression (source coding) of data in the form of permutations. This problem h...
We consider the problem of approximate sorting of a data stream (in one pass) with limited internal ...
We consider the problem of approximate sorting of a data stream (in one pass) with limited internal ...
We examine the structure of families of distortion balls from the perspective of Kolmogorov complexi...
In this paper, we investigate the problem of compression of data that are in the form of permutation...
Abstract—Classical rate-distortion theory requires specifying a source distribution. Instead, we ana...
Classical rate-distortion theory requires specifying a source distribution. Instead, we analyze rate...
Abstract — Classical rate-distortion theory requires knowledge of an elusive source distribution. In...
When examining the robustness of systems that take ranked lists as input, we can induce noise, measu...
We study the problem of learning probabilistic models for permutations, where the order between high...
We charactrize and investigate the highest achievable exponential growth rate of the expected number...