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Noah Stephens-Davidowitz
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Cited by
Cited by
Year
Pseudorandomness of Ring-LWE for any ring and modulus
C Peikert, O Regev, N Stephens-Davidowitz
STOC, 461-473, 2017
2622017
Solving the Shortest Vector Problem in time using discrete Gaussian sampling
D Aggarwal, D Dadush, O Regev, N Stephens-Davidowitz
STOC, 733-742, 2015
1962015
Cryptographic reverse firewalls
I Mironov, N Stephens-Davidowitz
Eurocrypt, 657-686, 2015
1222015
Solving the Closest Vector Problem in time--The discrete Gaussian strikes again!
D Aggarwal, D Dadush, N Stephens-Davidowitz
FOCS, 563-582, 2015
932015
Message transmission with reverse firewalls---secure communication on corrupted machines
Y Dodis, I Mironov, N Stephens-Davidowitz
CRYPTO, 2016
912016
On the Closest Vector Problem with a distance guarantee
D Dadush, O Regev, N Stephens-Davidowitz
CCC, 98-109, 2014
552014
Slide reduction, revisited---filling the gaps in SVP approximation
D Aggarwal, J Li, PQ Nguyen, N Stephens-Davidowitz
CRYPTO, 2020
452020
Implementing BP-obfuscation using graph-induced encoding
S Halevi, T Halevi, V Shoup, N Stephens-Davidowitz
CCS, 783-798, 2017
452017
How to eat your entropy and have it too: Optimal recovery strategies for compromised RNGs
Y Dodis, A Shamir, N Stephens-Davidowitz, D Wichs
Algorithmica 79, 1196-1232, 2017
442017
Discrete Gaussian sampling reduces to CVP and SVP
N Stephens-Davidowitz
SODA, 1748-1764, 2016
442016
On the quantitative hardness of CVP
H Bennett, A Golovnev, N Stephens-Davidowitz
FOCS, 13-24, 2017
412017
Just take the average! An embarrassingly simple -time algorithm for SVP (and CVP)
D Aggarwal, N Stephens-Davidowitz
SOSA, 2018
392018
A reverse Minkowski theorem
O Regev, N Stephens-Davidowitz
Annals of Mathematics 199 (1), 1-49, 2024
38*2024
(Gap/S) ETH hardness of SVP
D Aggarwal, N Stephens-Davidowitz
STOC, 2018
302018
Fine-grained hardness of CVP(P)---Everything that we can prove (and nothing else)
D Aggarwal, H Bennett, A Golovnev, N Stephens-Davidowitz
SODA, 2021
292021
An inequality for Gaussians on lattices
O Regev, N Stephens-Davidowitz
SIAM Journal on Discrete Mathematics 31 (2), 749-757, 2017
262017
Lattice reduction for modules, or how to reduce ModuleSVP to ModuleSVP.
T Mukherjee, N Stephens-Davidowitz
CRYPTO, 2020
202020
Just how hard are rotations of ? Algorithms and cryptography with the simplest lattice
H Bennett, A Ganju, P Peetathawatchai, N Stephens-Davidowitz
Eurocrypt, 2023
18*2023
On the Gaussian Measure Over Lattices.
N Stephens-Davidowitz
New York University, USA, 2017
182017
Dimension-preserving reductions between lattice problems
N Stephens-Davidowitz
noahsd.com, 2015
182015
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