07/21/2022, 12:21 PM
I see but when talking about iterating it, I understood it was just matter of first extending \(F_a(x)\) from \(\mathbb Z\) to the reals, and then looking for \(F_a^t\).
I was just saying that I was able to do something in that direction, just this.
Anyways, at this point I'd like to know, in your opinion, how exactly having a fully continuous iteration of \(F_a\) or even analytic or holomorphic, assume we get one, can help with hard number theory problems.
I was just saying that I was able to do something in that direction, just this.
Anyways, at this point I'd like to know, in your opinion, how exactly having a fully continuous iteration of \(F_a\) or even analytic or holomorphic, assume we get one, can help with hard number theory problems.
Mother Law \(\sigma^+\circ 0=\sigma \circ \sigma^+ \)
\({\rm Grp}_{\rm pt} ({\rm RK}J,G)\cong \mathbb N{\rm Set}_{\rm pt} (J, \Sigma^G)\)