We study a generalization of the k-list problem, also known as the Generalized Birthday problem. In the k-list problem, one starts with k lists of binary vectors and has to find a set of vectors – one from each list – that sum to the all-zero target vector. In our generalized Approximate k-list problem, one has to find a set of vectors that sum to a vector of small Hamming weight ω. Thus, we relax the condition on the target vector and allow for some error positions. This in turn helps us to significantly reduce the size of the starting lists, which determines the memory consumption, and the running time as a function of ω. For ω = 0, our algorithm achieves the original k-list run-time/memory consumption, whereas for ω = n/2 it has polynomi...
A c-short program for a string x is a description of x of length at most C(x) + c, where C(x) is the...
AbstractIn this paper we construct approximate algorithms for the following problems: integer multip...
In this work, we exhibit a hierarchy of polynomial time algorithms solving approximate variants of t...
We study a generalization of the k-list problem, also known as the Generalized Birthday problem. In ...
A well known birthday paradox is one the most important problems in cryptographic applications. Incr...
We study a k-dimensional generalization of the birthday problem: given k lists of n-bit values, find...
The generalized birthday problem (GBP) was introduced by Wagner in 2002 and has shown to have many a...
The 3SUM problem is a well-known problem in computer science and many geometric problems have been r...
International audienceThe k-xor or Generalized Birthday Problem aims at finding, given k lists of bi...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
We present randomized algorithms that solve Subset Sum and Knapsack instances with n items in O ∗(2 ...
The k-SUM problem is given n input real numbers to determine whether any k of them sum to zero. The ...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
A c-short program for a string x is a description of x of length at most C(x) + c, where C(x) is the...
AbstractIn this paper we construct approximate algorithms for the following problems: integer multip...
In this work, we exhibit a hierarchy of polynomial time algorithms solving approximate variants of t...
We study a generalization of the k-list problem, also known as the Generalized Birthday problem. In ...
A well known birthday paradox is one the most important problems in cryptographic applications. Incr...
We study a k-dimensional generalization of the birthday problem: given k lists of n-bit values, find...
The generalized birthday problem (GBP) was introduced by Wagner in 2002 and has shown to have many a...
The 3SUM problem is a well-known problem in computer science and many geometric problems have been r...
International audienceThe k-xor or Generalized Birthday Problem aims at finding, given k lists of bi...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
We present randomized algorithms that solve Subset Sum and Knapsack instances with n items in O ∗(2 ...
The k-SUM problem is given n input real numbers to determine whether any k of them sum to zero. The ...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
A c-short program for a string x is a description of x of length at most C(x) + c, where C(x) is the...
AbstractIn this paper we construct approximate algorithms for the following problems: integer multip...
In this work, we exhibit a hierarchy of polynomial time algorithms solving approximate variants of t...