Discrete Logarithm Over Finite Fields: Revision history

Jump to navigation Jump to search

Diff selection: Mark the radio buttons of the revisions to compare and hit enter or the button at the bottom.
Legend: (cur) = difference with latest revision, (prev) = difference with preceding revision, m = minor edit.

28 April 2023

10 April 2023

15 February 2023

  • curprev 10:2510:25, 15 February 2023Admin talk contribs 2,925 bytes +2,925 Created page with "{{DISPLAYTITLE:Discrete Logarithm Over Finite Fields (Logarithm Calculations)}} == Description == Let $F_{p^n}$ denote the finite field of $p^n$ elements, where $p$ is a prime. Let $x$ be a generator for the multiplicative group of $F_{p^n}$. The discrete logarithm problem over $F_{p^n}$ is to compute, for any given nonzero $h \in F_{p^n}$, the least nonnegative integer $e$ such that $x^e=h$. In this context we shall write $e=\log_x h$. == Parameters == <pre>n: numb..."