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2022-11-11 01:19:49 +0100 | edited question | Problems with factoring exponents in a prime field Problems with factoring exponents in a prime field if a, b, m, n ϵ Fp, with p is prime, and if b = a^m and c = b^n, th |
2022-11-11 01:18:43 +0100 | edited question | Problems with factoring exponents in a prime field Problems with factoring exponents in a prime field if a, b, m, n ϵ Fp, with p is prime, and if b = a^m and c = b^n, th |
2022-11-11 01:12:09 +0100 | edited question | Problems with factoring exponents in a prime field Problems with factoring exponents in a prime field if a, b, m, n ϵ Fp, with p is prime, and if b = a^m and c = b^n, th |
2022-11-11 01:10:39 +0100 | edited question | Problems with factoring exponents in a prime field Problems with factoring exponents in a prime field if a, b, m, n ϵ Fp, with p is prime, and if b = a^m and c = b^n, th |
2022-11-11 01:09:16 +0100 | asked a question | Problems with factoring exponents in a prime field Problems with factoring exponents in a prime field if a, b, m, n ϵ Fp, with p is prime, and if b = a^m and c = b^n, th |
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2022-10-31 01:12:10 +0100 | answered a question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) It could be a problem with the Pari implementation. The Weil pairing using the 'sage' algorithm provides the expected r |
2022-10-30 03:54:40 +0100 | commented question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) It could be a problem with the Pari implementation. The Weil pairing using the 'sage' algorithm provides the expected r |
2022-10-29 18:17:09 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-29 03:18:15 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-29 02:32:00 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-28 06:28:17 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-28 06:26:51 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
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2022-10-28 03:36:55 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-28 03:33:14 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-28 03:31:29 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-28 03:15:46 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-28 03:14:33 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-28 03:13:06 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-28 03:09:23 +0100 | commented question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) Thank you, Max, I have updated the question. |
2022-10-28 03:08:49 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) [Question updated to reflect progress] This question relates to |
2022-10-27 17:09:28 +0100 | commented question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) Thanks I changed the label. It makes the 'valence' error go away. Still now, there is the "points must be on the same cu |
2022-10-27 17:08:32 +0100 | commented question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) Thanks I changed the label. It makes the 'valence' error go away. Still now, there is the "points must be on the same cu |
2022-10-27 17:06:44 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) I have questions about how to implement a distortion map between |
2022-10-27 15:12:57 +0100 | commented question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) Thanks Max. I have edited the code above to fix it, and add your suggestion. When I run it now it has a new error ("poi |
2022-10-27 15:10:54 +0100 | commented question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) Thanks Max. you are right. I have edited the code above to fix it, and add your suggestion. When I run it now it has a |
2022-10-27 15:10:20 +0100 | commented question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) Thanks Max. you are right. I have edited the code above to fix it, and add your suggestion. When I run it now it has a |
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2022-10-27 06:38:32 +0100 | edited question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) I have questions about how to implement a distortion map between |
2022-10-27 05:32:14 +0100 | asked a question | distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) distortion map phi(x,y) = (-x, i*y) where i = sqrt(-1) I have questions about how to implement a distortion map between |
2022-10-22 09:13:18 +0100 | edited question | generating powers of g, an irreducible polynomial in an extension field generating powers of g, an irreducible polynomial in an extension field In an extension field, how do you to iteratively |
2022-10-22 06:56:41 +0100 | edited question | generating powers of g, an irreducible polynomial in an extension field generating powers of g, an irreducible polynomial in an extension feild In an extension field, how do you to iteratively |
2022-10-22 06:55:17 +0100 | asked a question | generating powers of g, an irreducible polynomial in an extension field generating powers of g, an irreducible polynomial in an extension feild In an extension field, how do you to iteratively |
2022-10-18 08:45:53 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Polynomial substitution in elliptic curves points and weil pairing In the code below, the Weil pairing returns an object |
2022-10-18 08:40:43 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Polynomial substitution in elliptic curves points and weil pairing In the code below, the Weil pairing returns an object |
2022-10-18 06:13:35 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Polynomial substitution in elliptic curves points and weil pairing In the code below, the Weil pairing returns an object |
2022-10-18 06:11:30 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Polynomial substitution in elliptic curves points and weil pairing In the code below, the Weil pairing returns an object |
2022-10-18 06:09:42 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Conversion of symbolic expression in elliptic curves In the code below, the Weil pairing returns an object of type 's |
2022-10-18 02:53:56 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Conversion of symbolic expression in elliptic curves In the code below, the Weil pairing returns an object of type 's |
2022-10-18 02:52:52 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Conversion of symbolic expression in elliptic curves In the code below, the Weil pairing returns an object of type 's |
2022-10-18 02:43:45 +0100 | commented question | Polynomial substitution in elliptic curves points and weil pairing Thanks for your response. Reworded the question to be clearer. Hope this helps |
2022-10-18 02:41:33 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Conversion of symbolic expression in elliptic curves In the code below, the Weil pairing returns an object of type 's |
2022-10-18 02:39:28 +0100 | received badge | ● Editor (source) |
2022-10-18 02:39:28 +0100 | edited question | Polynomial substitution in elliptic curves points and weil pairing Conversion of symbolic expression in elliptic curves In the code below, the Weil pairing returns an object of type 's |
2022-10-17 09:31:12 +0100 | asked a question | Polynomial substitution in elliptic curves points and weil pairing Conversion of symbolic expression in elliptic curves In the code below, the Weil pairing returns an object of type 's |