Statements (55)
| Predicate | Object |
|---|---|
| gptkbp:instanceOf |
gptkb:Architect
|
| gptkbp:allows |
explicit calculations
|
| gptkbp:area |
non-abelian structures
|
| gptkbp:canLeadTo |
coding theory
the theory of algebraic varieties the theory of motives |
| gptkbp:developedBy |
_Vladimir_Drinfeld
|
| gptkbp:exhibits |
Frobenius endomorphism
isogeny properties |
| gptkbp:has |
a rank
|
| gptkbp:hasRelatedPatent |
cryptography
|
| https://www.w3.org/2000/01/rdf-schema#label |
Drinfeld modules
|
| gptkbp:isAccessibleBy |
algebraic varieties
|
| gptkbp:isConnectedTo |
modular forms
the theory of schemes the study of rational points on varieties the study of rational points on curves. the_Langlands_program the_theory_of_algebraic_stacks |
| gptkbp:isCounteredBy |
power series
|
| gptkbp:isImportantFor |
finite fields
arithmetic geometry the study of arithmetic geometry the understanding of local fields the understanding of modular forms |
| gptkbp:isInvolvedIn |
the study of algebraic topology
the study of rational points on curves |
| gptkbp:isPartOf |
the_study_of_algebraic_groups
|
| gptkbp:isRelatedTo |
the theory of modular forms
the theory of motives the theory of algebraic curves the theory of Galois representations Drinfeld's_theorem |
| gptkbp:isStudiedIn |
algebraic geometry
their applications in number theory their endomorphism rings |
| gptkbp:isUsedBy |
the structure of algebraic groups
|
| gptkbp:isUsedFor |
rational points
Galois representations L-functions the theory of elliptic curves explicit models the construction of Galois representations the construction of function fields the structure of function fields the theory of p-adic representations their rank and level moduli_spaces |
| gptkbp:isUsedIn |
the_study_of_algebraic_cycles
|
| gptkbp:isUtilizedFor |
Galois cohomology
|
| gptkbp:mayHave |
automorphic forms
|
| gptkbp:provides |
a framework for p-adic analysis
|
| gptkbp:relatedTo |
function fields
|
| gptkbp:standardFeatures |
elliptic curves
|
| gptkbp:usedIn |
number theory
|