Linnik's theorem: Difference between revisions

Latest revision as of 23:39, 19 April 2009

Statement

There exist constants $C,L$ such that the following holds:

For any natural number $D$ and any integer $a$ that is relatively prime to $D$ , there exists a prime $p\leq CD^{L}$ such that $p\equiv a{\pmod {D}}$ .

In other words, the first Dirichlet prime for any congruence class relatively prime to the modulus is bounded by a polynomial in the modulus.

Heath-Brown has shown that we can take $L\leq 5.5$ .

Relation with other facts

Stronger facts and conjectures

The generalized Riemann hypothesis implies that any value of $L>2$ (with suitably chosen $C$ ) works. In other words, the first Dirichlet prime in any congruence class is $O(D^{2+\epsilon })$ .
Chowla's conjecture on the first Dirichlet prime states that we can use any $L>1$ , i.e., the first Dirichlet prime is $O(D^{1+\epsilon })$ .
Heath-Brown's conjecture on the first Dirichlet prime states that the first prime is $O(D(\log D)^{2})$ .

@@ Line 11: / Line 11: @@
 ==Relation with other facts==
-===Stronger facts===
+===Stronger facts and conjectures===
 * The [[generalized Riemann hypothesis]] implies that any value of <math>L > 2</math> (with suitably chosen <math>C</math>) works. In other words, the first Dirichlet prime in any congruence class is <math>O(D^{2 + \epsilon})</math>.
-* [[Chowla's conjecture on the first Dirichlet prime]] states that we can use any <math>L > 1</math>, i.e., the first Dirichlet prime is <math>O(D^{1 + \epsilon})</math>.
+* [[Weaker than::Chowla's conjecture on the first Dirichlet prime]] states that we can use any <math>L > 1</math>, i.e., the first Dirichlet prime is <math>O(D^{1 + \epsilon})</math>.
-* [[Heath-Brown's conjecture on the first Dirichlet prime]] states that the first prime is <math>O(D(\log D)^2)</math>.
+* [[Weaker than::Heath-Brown's conjecture on the first Dirichlet prime]] states that the first prime is <math>O(D(\log D)^2)</math>.