Timeline for What's the $\mathbb G_2$ point in the latest Satoh’s Miller inversion algorithm?
Current License: CC BY-SA 4.0
9 events
| when toggle format | what | by | license | comment | |
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| Jul 9 at 13:22 | comment | added | user2284570 | @DanielS It seems you didn’t understand the paper as the paper states $l$ is the order of the group in question, right ? | |
| Jul 9 at 13:10 | comment | added | Daniel S | In cases of interest, $d$ would be $\ell$, the order of the groups in question. | |
| Jul 9 at 13:06 | comment | added | user2284570 | @DanielS so $d$ is a specific parameter which is dependent of the pairing being used ? | |
| Jul 9 at 13:00 | comment | added | Daniel S | AIUI he is using $v$ as the target finite field value and $d$ as the multiplicity of the Miller function (i.e. we're finding $h_{d,A}(Q)=v$ where $h_{d,A}$ is a function with divisor $d[A]-[dA]-(d-1)[\mathcal O]$ | |
| Jul 9 at 12:51 | comment | added | user2284570 | @DanielS in such case, $F_r$ is the finite field element and $d$ is the embedding degree ? | |
| Jul 9 at 12:29 | comment | added | Daniel S | Is not the point denoted $A$ the parameter in question? | |
| Jul 9 at 11:58 | history | edited | user2284570 | CC BY-SA 4.0 | edited body |
| Jul 9 at 11:50 | comment | added | user2284570 | As a side quetion, would this inversion algorithm work in the case of pairings without final exponentiation like the ate or optimal ate pairing ? | |
| Jul 9 at 11:49 | history | asked | user2284570 | CC BY-SA 4.0 |