We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20.86n) time, where the O∗ (∙ ) notation suppresses factors polynomial in the input size, and polynomial space, assuming random read-only access to exponentially many random bits. These results can be extended to solve binary integer programming on n variables with few constraints in a similar running time. We also show that for any constant k ≥ 2, random instances of k-sum can be solved using O(nk -0.5polylog(n)) time and O(log n) space, without the assumption of random access to random bits. Underlying these results is an algorithm that determines whether two given lists of length n with integers bounded by a polynomial in n share a common va...
We present an O∗(20.5n) time and O∗(20.249999n) space randomized algorithm for solving worst-case Su...
We present an $\mathcal{O}^\star(2^{0.5n})$ time and $\mathcal{O}^\star(2^{0.249999n})$ space random...
Abstract. The technique of Schroeppel and Shamir (SICOMP, 1981) has long been the most efficient way...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
We present randomized algorithms that solve Subset Sum and Knapsack instances with n items in O ∗(2 ...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
Abstract. SubsetSum is a well known NP-complete problem: given t ∈ Z+ and a set S of m positive inte...
We study the exact time complexity of the Subset Sum problem. Our focus is on instances that lack ad...
The subset-sum problem (SSP) is de ned as follows: given a positive integer bound and a set of n p...
In the Equal-Subset-Sum problem, we are given a set S of n integers and the problem is to decide if ...
In dieser Arbeit wird eine verallgemeinerte Version wichtiger kombinatorischer Probleme, sogenannte ...
Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Comput...
The SUBSET SUM problem asks whether a given set of n positive integers contains a subset of elements...
We present an O∗(20.5n) time and O∗(20.249999n) space randomized algorithm for solving worst-case Su...
We present an $\mathcal{O}^\star(2^{0.5n})$ time and $\mathcal{O}^\star(2^{0.249999n})$ space random...
Abstract. The technique of Schroeppel and Shamir (SICOMP, 1981) has long been the most efficient way...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
We present randomized algorithms that solve Subset Sum and Knapsack instances with n items in O ∗(2 ...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
Abstract. SubsetSum is a well known NP-complete problem: given t ∈ Z+ and a set S of m positive inte...
We study the exact time complexity of the Subset Sum problem. Our focus is on instances that lack ad...
The subset-sum problem (SSP) is de ned as follows: given a positive integer bound and a set of n p...
In the Equal-Subset-Sum problem, we are given a set S of n integers and the problem is to decide if ...
In dieser Arbeit wird eine verallgemeinerte Version wichtiger kombinatorischer Probleme, sogenannte ...
Thesis: S.M., Massachusetts Institute of Technology, Department of Electrical Engineering and Comput...
The SUBSET SUM problem asks whether a given set of n positive integers contains a subset of elements...
We present an O∗(20.5n) time and O∗(20.249999n) space randomized algorithm for solving worst-case Su...
We present an $\mathcal{O}^\star(2^{0.5n})$ time and $\mathcal{O}^\star(2^{0.249999n})$ space random...
Abstract. The technique of Schroeppel and Shamir (SICOMP, 1981) has long been the most efficient way...