For entire functions with positive derivatives

such that

0 < a_(n+1) =< a_n

conjecture P :

There exists a fixed polynomial P(n) such that

(S9(n) / D^n f(x))^2 < P(n).

If I recall correctly for f(x) = exp(x) we have P(n) = e n.

Analogue for Q9(n) ... which follows from the SQ conjecture posted before.

regards

tommy1729

such that

0 < a_(n+1) =< a_n

conjecture P :

There exists a fixed polynomial P(n) such that

(S9(n) / D^n f(x))^2 < P(n).

If I recall correctly for f(x) = exp(x) we have P(n) = e n.

Analogue for Q9(n) ... which follows from the SQ conjecture posted before.

regards

tommy1729