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thông tin chi tiết - Algorithms and Data Structures - # Sorting under Partial Information

Efficient Algorithms for Sorting Under Partial Information


Khái niệm cốt lõi
The authors present an algorithm that efficiently recovers the linear order on a set of elements given a partial order and a linear order oracle, using subquadratic preprocessing time and optimal query time.
Tóm tắt

The content discusses the problem of sorting under partial information, where the input consists of a ground set X of size n, a partial oracle OP that provides information about a partial order P on X, and a linear oracle OL that specifies an unknown linear order L that extends P. The goal is to recover the linear order L using the fewest number of linear oracle queries.

The authors present the following key insights and results:

  1. They devise the first subquadratic time algorithm that performs O(log e(P)) linear oracle queries, where e(P) is the number of linear extensions of P. Specifically, for any constant c ≥ 1, their algorithm can preprocess the partial order P in O(n^(1+1/c)) time and then recover the linear order L in O(c log e(P)) time using linear oracle queries.

  2. They show a matching lower bound, proving that their algorithm is asymptotically tight with respect to the number of partial order queries, linear order queries, and time spent.

  3. The algorithm works in two phases: a preprocessing phase that computes a sparse representation of the partial order, and a query phase that efficiently merges this representation to recover the linear order.

  4. The key ideas are to (1) compute an approximately maximum chain in the partial order, (2) identify a maximal set of large antichains, and (3) use a greedy chain decomposition of the remaining elements. This allows the algorithm to avoid the quadratic complexity of previous approaches.

  5. The authors prove that large antichains in the partial order can be used to efficiently approximate the log-extensions of the partial order, which is crucial for the optimality of their approach.

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by Ivor van der... lúc arxiv.org 04-15-2024

https://arxiv.org/pdf/2404.08468.pdf
Tight Bounds for Sorting Under Partial Information

Yêu cầu sâu hơn

How can the ideas presented in this work be extended to other problems involving partial information, such as finding the maximum element or computing the Pareto frontier

The ideas presented in this work can be extended to other problems involving partial information by adapting the algorithm to suit the specific requirements of the new problem. For example, in the case of finding the maximum element under partial information, the algorithm could be modified to focus on identifying the chain that contains the maximum element and then efficiently merging this chain with the rest of the elements. Similarly, for computing the Pareto frontier, the algorithm could be adjusted to prioritize the comparison of elements based on their Pareto dominance relationships.

What are the practical implications of this work, and how could it be applied to real-world scenarios where partial information is available

The practical implications of this work are significant, especially in scenarios where partial information is common. One application could be in data analysis, where the algorithm could be used to efficiently sort and organize data based on partial information available. This could be particularly useful in situations where complete information is not accessible or where the dataset is too large to process in its entirety. Additionally, the algorithm could be applied in optimization problems where finding the optimal solution requires sorting elements based on partial information.

Can the techniques used in this algorithm be adapted to handle dynamic updates to the partial order, where elements are added or removed over time

The techniques used in this algorithm can be adapted to handle dynamic updates to the partial order by incorporating mechanisms for efficiently updating the partial order when elements are added or removed. This could involve maintaining data structures that allow for quick insertion and deletion of elements while ensuring that the linear order is consistently updated. By implementing algorithms for dynamic updates, the system can continuously adjust to changes in the partial order without compromising the efficiency of the sorting process.
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