Impact
~7k
people reached
- 0 posts edited
- 0 helpful flags
- 6 votes cast
Sep
16 |
awarded | Curious |
Sep
15 |
accepted | Django forms.SelectMultiple complains about choices |
Sep
15 |
asked | Django forms.SelectMultiple complains about choices |
May
23 |
comment |
Library for sampling from a discrete Gaussian distribution
Thanks, but this is not exactly the same. In a continuous Gaussian which result is rounded, the probability to sample the integer n is the integral from n-0.5 to n+0.5. In a discrete Gaussian, the probability to sample the integer n is f(n) where f describes the Gaussian curve. While the statistical distance between the two distributions is rather small, its not small enough such that security proofs (in terms of cryptography) hold for the rounded distribution. |
May
17 |
comment |
Library for sampling from a discrete Gaussian distribution
std::normal_distribution is for a continuous Gaussian. Here I'm interested in a discrete Gaussian. |
May
17 |
asked | Library for sampling from a discrete Gaussian distribution |
Mar
15 |
asked | Polynomial rings with FLINT (or NTL) |
Jan
13 |
comment |
Compiling Android with mmm and make snod
for solution see stackoverflow.com/questions/13135844/… |
Jan
13 |
accepted | Adding own framework or library to AOSP |
Jan
11 |
revised |
Adding own framework or library to AOSP
added 281 characters in body |
Jan
11 |
asked | Adding own framework or library to AOSP |
Jan
8 |
asked | Compiling Android with mmm and make snod |
Jan
6 |
revised |
Accessing KeyStore from Android System
add alternative approach |
Jan
6 |
asked | Accessing KeyStore from Android System |
Nov
11 |
asked | Where in the Android Source are SMS sent and received |
Nov
10 |
accepted | Test overridden save method in Django |
Nov
10 |
asked | Test overridden save method in Django |
Aug
23 |
comment |
Performance comparison: 64 bit and 32 bit multiplication
it was the memory. I read the numbers from huge arrays on the heap. This, as explained in the comment from Hans, lasts twice as long for larger integers. Without reading the numbers from memory (instead generating them from random) the difference is much much smaller. The remaining difference might be due to the fact that calculations on 32 bit instead of 64 bit registers are up to one or two cycles faster. Thanks a lot for all comments and answers. |
Aug
23 |
asked | Performance comparison: 64 bit and 32 bit multiplication |
Jun
4 |
awarded | Teacher |