Littlewood's theorem on the distribution of quotients
GPTKB entity
Properties (42)
| Predicate | Object |
|---|---|
| gptkbp:instanceOf |
gptkb:theorem
|
| gptkbp:associated_with |
Littlewood's_work_on_primes
|
| gptkbp:designedBy |
distribution of quotients of integers
|
| gptkbp:expansion |
other mathematical contexts
|
| gptkbp:explores |
advanced mathematics courses
|
| gptkbp:has_a |
historical significance
implications for theoretical mathematics inspired further research influenced mathematical thought numerous applications |
| gptkbp:has_a_focus_on |
mathematical research
|
| gptkbp:has_implications_for |
distribution of prime numbers
|
| gptkbp:hasPrograms |
cryptography
|
| https://www.w3.org/2000/01/rdf-schema#label |
Littlewood's theorem on the distribution of quotients
|
| gptkbp:is_a |
properties of integers
|
| gptkbp:is_a_popular_spot_for |
referenced in academic papers
|
| gptkbp:is_a_source_of |
the field of mathematics
|
| gptkbp:is_a_subject_of |
widely recognized
mathematical conferences modern number theory considered fundamental debated among mathematicians proven and analyzed the study of quotients |
| gptkbp:is_designed_to |
gptkb:John_Edensor_Littlewood
|
| gptkbp:is_essential_for |
analytic methods in number theory
understanding prime numbers |
| gptkbp:is_part_of |
analytic number theory
|
| gptkbp:is_studied_in |
many mathematicians
quotients of integers |
| gptkbp:is_used_in |
research papers
mathematical literature textbooks on number theory |
| gptkbp:isConnectedTo |
gptkb:Riemann_Hypothesis
distribution of integers |
| gptkbp:publishedBy |
1914
|
| gptkbp:related_to |
number theory
computational number theory distribution functions |
| gptkbp:suitableFor |
asymptotic analysis
|
| gptkbp:was_a_result_of |
integer sequences
density of quotients |