Statements (45)
| Predicate | Object |
|---|---|
| gptkbp:instanceOf |
gptkb:theorem
|
| gptkbp:associated_with |
the_work_of_G.H._Hardy
|
| gptkbp:claims |
the existence of infinitely many prime gaps
|
| gptkbp:description |
the distribution of prime numbers
|
| gptkbp:expansion |
other areas of mathematics
|
| gptkbp:explores |
mathematical seminars
|
| gptkbp:has_implications_for |
gptkb:the_Riemann_Hypothesis
|
| gptkbp:hasPrograms |
cryptography
|
| https://www.w3.org/2000/01/rdf-schema#label |
Littlewood's theorem
|
| gptkbp:influenced |
modern number theory
|
| gptkbp:is_a_subject_of |
mathematical research
mathematical proofs has historical significance analytic combinatorics is often included in mathematical curricula has implications for computer science has been influential in the development of new theories has been applied in theoretical physics has been discussed in textbooks has been the basis for further research has been the focus of many research projects has been the subject of many discussions is often analyzed for its implications is often included in mathematical anthologies is often used in mathematical competitions is relevant to algorithm design is significant for its proof techniques is studied in relation to random number theory is often referenced in discussions of prime number theory |
| gptkbp:is_essential_for |
the study of additive number theory
|
| gptkbp:is_part_of |
the_Hardy-Littlewood_circle_method
|
| gptkbp:is_studied_in |
the behavior of prime numbers
|
| gptkbp:is_used_in |
advanced mathematics courses
academic papers mathematical literature the distribution of primes |
| gptkbp:isConnectedTo |
the distribution of composite numbers
|
| gptkbp:previousName |
gptkb:John_Edensor_Littlewood
|
| gptkbp:publishedBy |
1914
|
| gptkbp:related_to |
number theory
the twin prime conjecture |
| gptkbp:suitableFor |
fundamental theorem in mathematics
|
| gptkbp:was_a_result_of |
analytic number theory
the study of prime number theory has been proven by various mathematicians |