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🤖 Generated with SplitRS
Functions§
- a1_
homotopy_ type_ ty A1HomotopyType : Scheme → A1SpaceObjThe A¹-homotopy type Sing^{A¹}(X) of an algebraic variety X.- abelian_
variety_ ty AbelianVariety : Field → Nat → TypeAn abelian variety over a field k of dimension g is a smooth projective group variety.- absolute_
height_ ty AbsoluteHeight : ProjectivePoint → RealH(P) = max|x_i|_v, the absolute Weil height on projective space.- adic_
space_ ty AdicSpace : HuberRing → TypeAn adic space Spa(A, A+) for a Huber ring A, generalizing rigid analytic spaces.- affinoid_
algebra_ ty AffinoidAlgebra : NonArchField → TypeAn affinoid algebra T_n/I over a non-archimedean field K.- analytic_
ring_ structure_ ty - Analytic ring structure: every solid abelian group admits a natural analytic ring structure.
- andre_
oort_ conjecture_ ty TolimaniConjecture : ShimuraVarietyObj → PropThe André-Oort conjecture: special subvarieties are Zariski closures of special points.- app
- app2
- app3
- arrow
- automorphic_
representation_ ty AutomorphicRepresentation : ReductiveGroup → TypeAn automorphic representation π = ⊗_v π_v of a reductive group G over a number field.- beilinson_
lichtenbaum_ ty - Beilinson-Lichtenbaum conjecture (proved): motivic cohomology agrees with étale cohomology in the range p ≤ q (mod n).
- berkovich_
skeleton_ retract_ ty - Berkovich analytification is a retract onto the skeleton.
- berkovich_
space_ ty BerkovichSpace : AffinoidAlgebra → TypeThe Berkovich space M(A) of an affinoid algebra A: the space of bounded multiplicative seminorms.- bool_ty
- bsd_
conjecture_ ty - BSD conjecture data: rank of E(ℚ) equals order of vanishing of L(E, s) at s=1.
- build_
env - Register all arithmetic geometry axioms and theorem types in the environment.
- bvar
- canonical_
model_ ty CanonicalModel : ShimuraVarietyObj → ReflexField → AlgebraicVarietyThe canonical model of a Shimura variety over its reflex field E(G, X).- condensed_
set_ ty CondensedSet : TypeA condensed set is a sheaf of sets on the category of profinite sets (Clausen-Scholze).- crystalline_
cohomology_ ty CrystallineCohomology : Scheme → Ring → AbelianGroupCrystalline cohomology H^i_{cris}(X/W) of a smooth proper variety in characteristic p.- crystalline_
de_ rham_ iso_ ty - Crystalline comparison theorem (Berthelot-Ogus): for a smooth proper scheme over W(k), H^i_{cris}(X_k/W(k)) ≅ H^i_{dR}(X/W(k)).
- cst
- diamond_
ty Diamond : PerfectoidSpaceObj → TypeX^◇ = X / (Frobenius equivalence), the diamond associated to a perfectoid space.- dual_
abelian_ variety_ ty DualAbelianVariety : AbelianVarietyObj → AbelianVarietyObjA^ = Pic^0(A), the dual abelian variety (variety of degree-0 line bundles).- elliptic_
curve_ ty EllipticCurve : Field → TypeAn elliptic curve E/k given by a Weierstrass equation y² = x³ + ax + b.- faltings_
height_ ty FaltingsHeight : AbelianVarietyObj → RealThe Faltings height h_F(A) of a principally polarized abelian variety A.- faltings_
mordell_ ty - Faltings’s theorem (Mordell conjecture, proved by Faltings 1983).
- faltings_
thm_ ty FaltingsThm : AlgebraicCurve → PropFaltings’s theorem (Mordell conjecture): a curve of genus ≥ 2 over ℚ has finitely many rational points.- fontaine_
de_ rham_ comparison_ ty - Fontaine’s C_dR ⊗ D_dR(V) ≅ C_dR ⊗ V: de Rham comparison for p-adic representations.
- fontaine_
theory_ ty FontaineTheory : PAdicField → GaloisRepresentationObj → HodgeTateDecompFontaine’s theory associates a Hodge-Tate decomposition to a de Rham Galois representation.- galois_
representation_ ty GaloisRepresentation : GaloisGroup → Nat → Ring → TypeA continuous homomorphism ρ: G_K → GL_n(R).- global_
langlands_ ty - Global Langlands conjecture: correspondence between automorphic forms and Galois representations.
- hasse_
bound - Estimate the number of rational points on E(𝔽_q) using Hasse’s bound.
- height_
function_ ty HeightFunction : EllipticCurveObj → EllipticPointObj → RealThe canonical Néron-Tate height ĥ: E(K̄) → ℝ.- int_ty
- isogeny_
theorem_ ty - Isogeny theorem: for abelian varieties over finite fields, Hom(A, B) ⊗ ℤ_ℓ ≅ Hom(T_ℓ A, T_ℓ B).
- isogeny_
ty Isogeny : EllipticCurveObj → EllipticCurveObj → TypeA group homomorphism φ: E → E’ with finite kernel.- j_
invariant - j-invariant of y² = x³ + ax + b (returns None if singular).
- langlands_
correspondence_ ty LanglandsCorrespondence : GaloisRepresentationObj → AutomorphicRepresentationObj → PropThe local/global Langlands correspondence: ρ_π ↔ π.- liquid_
tensor_ exact_ ty - Liquid tensor product: the p-liquid tensor product is exact for 0 < p ≤ 1.
- liquid_
vector_ space_ ty LiquidVectorSpace : Real → CondensedVectorSpaceObj → PropA p-liquid vector space V is a condensed vector space satisfying the p-liquid condition.- list_ty
- local_
langlands_ gl_ n_ ty - Local Langlands correspondence for GL_n.
- log_
crystalline_ cohomology_ ty LogCrystallineCohomology : LogSchemeObj → Ring → AbelianGroupLog-crystalline cohomology H^i_{log-cris}(X/W) with W the Witt vectors.- log_
etale_ cohomology_ ty LogEtaleCohomology : LogSchemeObj → Nat → AbelianGroupLog-étale cohomology H^i_{log-et}(X, Z/nZ) of a log scheme X.- log_
scheme_ ty LogScheme : Scheme → LogStructure → TypeA log scheme (X, M_X) where M_X is a sheaf of monoids on X (Fontaine-Illusie-Kato).- logarithmic_
height_ ty LogarithmicHeight : ProjectivePoint → Realh(P) = log H(P), the logarithmic Weil height.- mixed_
motive_ ty MixedMotive : NumberField → TypeA mixed motive over a number field K: an object in Voevodsky’s triangulated category of motives.- mordell_
weil_ ty - Mordell-Weil theorem: E(K) is a finitely generated abelian group.
- motivic_
chow_ comparison_ ty - Motivic cohomology comparison: H^{2n,n}(X, Z) ≅ CH^n(X) (Chow groups).
- motivic_
cohomology_ ty MotivicCohomology : Scheme → Int → Int → AbelianGroupMotivic cohomology H^{p,q}(X, Z), the bigraded cohomology theory of algebraic varieties.- nat_ty
- nearly_
ordinary_ representation_ ty NearlyOrdinaryRepresentation : GaloisGroup → Prime → TypeA p-adic Galois representation admitting a Borel reduction at p (ordinary at p).- neron_
mapping_ property_ ty - Néron mapping property: every rational map from a smooth scheme to A extends to N(A).
- neron_
model_ ty NeronModel : AbelianVarietyObj → DVRing → GroupSchemeThe Néron model N(A) of an abelian variety A over the fraction field of a DVR.- neron_
tate_ parallelogram_ ty - Néron-Tate height satisfies the parallelogram law.
- northcott_
faltings_ height_ ty - Northcott for Faltings heights: there are finitely many isomorphism classes of principally polarized abelian varieties over K with bounded Faltings height and fixed dimension.
- northcott_
projective_ ty - Northcott property for projective space.
- northcott_
property_ ty NorthcottProperty : Type → PropA set S has the Northcott property if for all B, {P ∈ S : H(P) ≤ B} is finite.- perfectoid_
space_ ty PerfectoidSpace : TypeA perfectoid space is a topological space with a perfectoid algebra structure, used to transfer problems between characteristic 0 and characteristic p.- pi
- poincare_
reducibility_ ty - Poincaré reducibility: every abelian variety is isogenous to a product of simple abelian varieties.
- polarized_
abelian_ variety_ ty PolarizedAbelianVariety : Field → Nat → TypeAn abelian variety together with an ample line bundle (polarization).- prismatic_
cohomology_ ty PrismaticCohomology : Scheme → Prism → AbelianGroupThe prismatic cohomology H^*_{Δ}(X/A) of a p-adic formal scheme X over a prism (A, I).- prismatic_
comparison_ ty - Prismatic comparison: prismatic cohomology specializes to de Rham, étale, and crystalline cohomology.
- pro_
etale_ comparison_ ty - Pro-étale cohomology: the pro-étale cohomology of X with coefficients in Z_ℓ.
- pro_
etale_ topos_ ty ProEtaleTopos : Scheme → ToposThe pro-étale topos X_{pro-ét} of a scheme X (Bhatt-Scholze).- prop
- rank_
lower_ bound_ 2descent - Compute the rank of an elliptic curve E/ℚ via naive 2-descent lower bound.
- real_ty
- rigid_
analytic_ space_ ty RigidAnalyticSpace : NonArchField → TypeA rigid analytic space (Tate, 1971) over a non-archimedean field.- rigid_
gaga_ ty - GAGA for rigid analytic spaces: coherent analytic sheaves correspond to algebraic coherent sheaves.
- sato_
tate_ ty - Sato-Tate conjecture: for a non-CM elliptic curve E/ℚ, the distribution of a_p / 2√p is equidistributed with respect to the Sato-Tate measure on [-1, 1].
- semi_
stable_ reduction_ ty - Semi-stable reduction theorem: after a finite base change, any abelian variety becomes semi-stable.
- shimura_
datum_ ty ShimuraDatum : ReductiveGroup → HermitianDomain → TypeA Shimura datum (G, X) where G is a reductive group and X a hermitian symmetric domain.- shimura_
reciprocity_ ty - Reciprocity law for Shimura varieties: Frobenius acts on special points via the reflex norm.
- shimura_
variety_ ty ShimuraVariety : ShimuraDatumObj → CompactOpenSubgroup → TypeSh_K(G, X) = G(ℚ) \ X × G(𝔸_f) / K, a moduli space of abelian varieties with extra structure.- slice_
filtration_ ty SliceFiltration : MotiveObj → Nat → MotiveObjVoevodsky’s slice filtration s_n(M): the n-th slice of a motive M.- solid_
abelian_ group_ ty SolidAbelianGroup : CondensedAbelianGroupObj → PropA condensed abelian group is solid if it satisfies the solid module condition (Clausen-Scholze).- syntomic_
cohomology_ ty Syntomic Cohomology : Scheme → Nat → AbelianGroupSyntomic cohomology H^i_{syn}(X, Z_p(n)), interpolating between crystalline and étale.- tate_
module_ rank_ ty - Tate module rank theorem.
- tate_
module_ ty TateModule : AbelianVarietyObj → Prime → ZpModuleT_p(A) = lim_{n} A[p^n], the p-adic Tate module of A, free of rank 2g over ℤ_p.- tilting_
equivalence_ ty - Tilting equivalence: there is an equivalence between perfectoid spaces of characteristic 0 and characteristic p via the tilt functor X ↦ X^♭.
- torsion_
point_ ty TorsionPoint : EllipticCurveObj → Nat → TypeE[n] = {P ∈ E : nP = O}, the n-torsion subgroup.- torsion_
structure_ ty - Torsion structure: E[n] ≅ (ℤ/nℤ)² over an algebraically closed field of characteristic 0.
- type0
- type1
- v_
stack_ ty VStack : Site → TypeA v-stack (sheaf on the v-topology), generalizing perfectoid spaces and diamonds.- voevodsky_
cancellation_ ty - Voevodsky’s cancellation theorem: ⊗ A¹ is invertible in the motivic stable homotopy category.
- weierstrass_
discriminant - Discriminant of a Weierstrass cubic y² = x³ + ax + b.
- weil_
pairing_ ty - Weil pairing: E[n] × E^[n] → μ_n (alternating, non-degenerate).