Lecture 28 Flashcards
1
Q
If f(s) has a pole of order k at s = α, then the quotient f′(s)/f(s) has apole, state where, the residue and the prder
A
first order
pole at s = α with residue −k
2
Q
The function F(s) = −ζ′(s)/ζ(s) − 1/(s − 1) is analytic where
A
at s=1
3
Q
For x ≥ 1, we have ψ1(x)/x^2 − 1/2 (1 −1/x)^2 = (1/2π) ∫^∞_(−∞) h(1 + it)e^(itlog x) dt
where the integral
∫^∞^(−∞) ∣h(1 + it)∣dt converges
What does this imply
A
Therefore, by the Riemann-Lebesgue Lemma, we have
- ψ1(x) ∼ 1/2 x^2
and hence
- ψ(x) ∼ x as x → ∞.
4
Q
Assume σ ≥ 1/2 . Then, there exists constants A > 0 and C > 0 such that ∣ζ(σ + it)∣ >Clog^7t
When does this hold and what does it imply
A
whenever 1 −Alog^9t< σ ≤ 1 and t ≥ e (5)
- This implies that ζ(σ + it) ≠ 0 if σ and t satisfy (5).
