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- Artin's_conjecture_on_primitive_roots abstract "In number theory, Artin's conjecture on primitive roots states that a given integer a which is not a perfect square and not −1 is a primitive root modulo infinitely many primes p. The conjecture also ascribes an asymptotic density to these primes. This conjectural density equals Artin's constant or a rational multiple thereof. The conjecture was made by Emil Artin to Helmut Hasse on September 27, 1927, according to the latter's diary. Although significant progress has been made, the conjecture is still unresolved as of January 2014. In fact, there is no single value of a for which Artin's conjecture is proved.".
- Artin's_conjecture_on_primitive_roots wikiPageExternalLink mi.dvi.
- Artin's_conjecture_on_primitive_roots wikiPageID "2085185".
- Artin's_conjecture_on_primitive_roots wikiPageRevisionID "606436794".
- Artin's_conjecture_on_primitive_roots hasPhotoCollection Artin's_conjecture_on_primitive_roots.
- Artin's_conjecture_on_primitive_roots subject Category:Algebraic_number_theory.
- Artin's_conjecture_on_primitive_roots subject Category:Analytic_number_theory.
- Artin's_conjecture_on_primitive_roots subject Category:Conjectures_about_prime_numbers.
- Artin's_conjecture_on_primitive_roots type Abstraction100002137.
- Artin's_conjecture_on_primitive_roots type Cognition100023271.
- Artin's_conjecture_on_primitive_roots type Concept105835747.
- Artin's_conjecture_on_primitive_roots type ConjecturesAboutPrimeNumbers.
- Artin's_conjecture_on_primitive_roots type Content105809192.
- Artin's_conjecture_on_primitive_roots type Hypothesis105888929.
- Artin's_conjecture_on_primitive_roots type Idea105833840.
- Artin's_conjecture_on_primitive_roots type PsychologicalFeature100023100.
- Artin's_conjecture_on_primitive_roots type Speculation105891783.
- Artin's_conjecture_on_primitive_roots comment "In number theory, Artin's conjecture on primitive roots states that a given integer a which is not a perfect square and not −1 is a primitive root modulo infinitely many primes p. The conjecture also ascribes an asymptotic density to these primes. This conjectural density equals Artin's constant or a rational multiple thereof. The conjecture was made by Emil Artin to Helmut Hasse on September 27, 1927, according to the latter's diary.".
- Artin's_conjecture_on_primitive_roots label "Artin's conjecture on primitive roots".
- Artin's_conjecture_on_primitive_roots label "Congettura di Artin".
- Artin's_conjecture_on_primitive_roots label "Conjecture d'Artin sur les racines primitives".
- Artin's_conjecture_on_primitive_roots label "Conjetura de Artin sobre raíces primitivas".
- Artin's_conjecture_on_primitive_roots label "Гипотеза Артина".
- Artin's_conjecture_on_primitive_roots sameAs Conjetura_de_Artin_sobre_raíces_primitivas.
- Artin's_conjecture_on_primitive_roots sameAs Conjecture_d'Artin_sur_les_racines_primitives.
- Artin's_conjecture_on_primitive_roots sameAs Congettura_di_Artin.
- Artin's_conjecture_on_primitive_roots sameAs m.06l4gn.
- Artin's_conjecture_on_primitive_roots sameAs Q2319635.
- Artin's_conjecture_on_primitive_roots sameAs Q2319635.
- Artin's_conjecture_on_primitive_roots sameAs Artin's_conjecture_on_primitive_roots.
- Artin's_conjecture_on_primitive_roots wasDerivedFrom Artin's_conjecture_on_primitive_roots?oldid=606436794.
- Artin's_conjecture_on_primitive_roots isPrimaryTopicOf Artin's_conjecture_on_primitive_roots.