Add to ORKGAt Crypto '99, Nguyen and Stern described a lattice based algorithm for solving the hidden subset sum problem, a variant of the classical subset sum problem where the n weights are also hidden. While the Nguyen-Stern algorithm works quite well in practice for moderate values of n, we argue that its complexity is actually exponential in n; namely in the final step one must recover a very short basis of a n-dimensional lattice, which takes exponential-time in n, as one must apply BKZ reduction with increasingly large block-sizes
Abstract. We discuss a higher dimensional generalization of the Hidden Number Problem and generalize...
The Lattice Isomorphism Problem (LIP) is the computational task of recovering, assuming it exists, a...
We study the quantum complexity of solving the subset sum problem, where the elements a_1, ..., a_n ...
At Crypto ’99, Nguyen and Stern described a lattice based algorithm for solving the hidden subset su...
We consider the problem of revealing a small hidden lattice from the knowledge of a low-rank sublatt...
simple and very fast methods for generating randomly distributed pairs of the form (x, g x mod p) us...
In this talk, which is based on joint work with Luca Notarnicola, I will present the Hidden Lattice ...
We introduce algorithms for lattice basis reduction that are improvements of the famous L 3 -algor...
We introduce algorithms for lattice basis reduction that are improvements of the famous L3-algorithm...
Given a set of integers produced as subset-sums with respect to the same set of unknown weights, the...
We give a survey of recent results on the hidden number problem introduced by Boneh and Venkatesan i...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
The Modular Inversion Hidden Number Problem (MIHNP) was introduced by Boneh, Halevi and Howgrave-Gra...
. The general subset sum problem is NP-complete. However, there are two algorithms, one due to Brick...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
Abstract. We discuss a higher dimensional generalization of the Hidden Number Problem and generalize...
The Lattice Isomorphism Problem (LIP) is the computational task of recovering, assuming it exists, a...
We study the quantum complexity of solving the subset sum problem, where the elements a_1, ..., a_n ...
At Crypto ’99, Nguyen and Stern described a lattice based algorithm for solving the hidden subset su...
We consider the problem of revealing a small hidden lattice from the knowledge of a low-rank sublatt...
simple and very fast methods for generating randomly distributed pairs of the form (x, g x mod p) us...
In this talk, which is based on joint work with Luca Notarnicola, I will present the Hidden Lattice ...
We introduce algorithms for lattice basis reduction that are improvements of the famous L 3 -algor...
We introduce algorithms for lattice basis reduction that are improvements of the famous L3-algorithm...
Given a set of integers produced as subset-sums with respect to the same set of unknown weights, the...
We give a survey of recent results on the hidden number problem introduced by Boneh and Venkatesan i...
We present space efficient Monte Carlo algorithms that solve Subset Sum and Knapsack instances with ...
The Modular Inversion Hidden Number Problem (MIHNP) was introduced by Boneh, Halevi and Howgrave-Gra...
. The general subset sum problem is NP-complete. However, there are two algorithms, one due to Brick...
We present randomized algorithms that solve subset sum and knapsack instances with n items in O∗ (20...
Abstract. We discuss a higher dimensional generalization of the Hidden Number Problem and generalize...
The Lattice Isomorphism Problem (LIP) is the computational task of recovering, assuming it exists, a...
We study the quantum complexity of solving the subset sum problem, where the elements a_1, ..., a_n ...