Heilbronn Halberstam

E637295

theorem in analytic number theory

Heilbronn–Halberstam refers to a result in analytic number theory, associated with Hans Heilbronn and H. Halberstam, concerning the distribution of prime numbers in arithmetic progressions.

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All labels observed (2)

Label	Occurrences
Heilbronn Halberstam canonical	1
Heini Halberstam	1

Statements (20)

Predicate	Object
instanceOf	theorem in analytic number theory ⓘ
approximateDate	20th century ⓘ
area	prime number theory ⓘ
concerns	distribution of prime numbers in arithmetic progressions ⓘ primes in arithmetic progressions ⓘ
describes	average distribution of primes over moduli ⓘ
field	analytic number theory ⓘ
hasAuthor	Hans Heilbronn NERFINISHED ⓘ Hugh Halberstam NERFINISHED ⓘ
mathematicalSubjectClassification	11N13 ⓘ 11N36 ⓘ
namedAfter	Hans Heilbronn NERFINISHED ⓘ Hugh Halberstam NERFINISHED ⓘ
relatedTo	Bombieri–Vinogradov theorem NERFINISHED ⓘ Dirichlet’s theorem on arithmetic progressions NERFINISHED ⓘ generalized Riemann hypothesis NERFINISHED ⓘ
topic	distribution of primes in residue classes ⓘ
usesConcept	Dirichlet characters NERFINISHED ⓘ L-functions NERFINISHED ⓘ sieve methods ⓘ

Referenced by (2)

Full triples — surface form annotated when it differs from this entity's canonical label.

H. Halberstam → name → Heilbronn Halberstam ⓘ

Theodor Estermann → notableStudent → Heilbronn Halberstam ⓘ

this entity surface form: Heini Halberstam