Author:
(1) Yitang Zhang.
Table of Links
- Abstract & Introduction
- Notation and outline of the proof
- The set Ψ1
- Zeros of L(s, ψ)L(s, χψ) in Ω
- Some analytic lemmas
- Approximate formula for L(s, ψ)
- Mean value formula I
- Evaluation of Ξ11
- Evaluation of Ξ12
- Proof of Proposition 2.4
- Proof of Proposition 2.6
- Evaluation of Ξ15
- Approximation to Ξ14
- Mean value formula II
- Evaluation of Φ1
- Evaluation of Φ2
- Evaluation of Φ3
- Proof of Proposition 2.5
Appendix A. Some Euler products
Appendix B. Some arithmetic sums
18. Proof of Proposition 2.5
By the discussion at the end of Section 2, it suffices to prove (2.32) and (2.33).
Proof of (2.32).
By (12.3), (12,17), (13.7), (15.24), (16.17) and (17.10),
In view of (15.), we can write
By calculation (there is a theoretical interpretation),
Hence
Direct calculation shows that
It follows from (8.24), (9.8) and (18.2) that
This with together (8.23), (9.7) and (18.1) yields (2.32).
Proof of (2.33).
By Lemma 8.1,
We have
The right side is split into three sums according to
Thus we have the crude bound
so that
This yields (2.33) by Lemma 8.1 and Proposition 7.1
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