Fermat curve

E146193

A Fermat curve is an algebraic curve defined by an equation of the form \(x^n + y^n = 1\), studied in number theory and algebraic geometry for its rich arithmetic and geometric properties.

All labels observed (1)

Label Occurrences
Fermat curve canonical 1

How this entity was disambiguated

Statements (47)

Predicate Object
instanceOf algebraic curve
curve over the rational numbers
geometrically irreducible curve
nonsingular curve
plane curve
projective curve
smooth curve
ambientSpace affine plane
projective plane
BelyiType three-point branched cover of ℙ¹
classification elliptic curve for n = 3 in suitable form
non-hyperelliptic for n ≥ 4
definedByEquation X^n + Y^n = Z^n in projective coordinates
x^n + y^n = 1
degree n
fieldOfStudy algebraic geometry
arithmetic geometry
number theory
genus (n − 1)(n − 2)/2 for n ≥ 3
hasAutomorphismGroup large finite group depending on n
hasComplexPoints compact Riemann surface for n ≥ 3
hasCoverings covers of the projective line branched at three points
hasJacobian abelian variety decomposing into factors with complex multiplication
hasProperty may be singular in characteristic p dividing n
smooth over fields of characteristic not dividing n
hasSymmetryGroup group of permutations of coordinates and n-th roots of unity
hasWeierstrassPoints points with special gap sequences depending on n
namedAfter Pierre de Fermat
overField complex numbers ℂ
rational numbers ℚ
parameter positive integer n ≥ 3
rationalPointsProperty for n ≥ 4 has only trivial rational points (by Fermat’s Last Theorem)
relatedObject Fermat surface
superelliptic curve
relatedTo Kummer extensions
cyclotomic fields
relatedToConjecture Fermat's Last Theorem
surface form: Fermat’s Last Theorem
specialCase unit circle for n = 2
specialCaseOf superelliptic curve y^m = f(x)
studiedFor Diophantine properties
Galois representations
Jacobian variety structure
modular forms connections
trivialRationalPoints (±1,0) and (0,±1) in affine form
usedIn examples in arithmetic geometry
examples of curves with many automorphisms
testing conjectures on rational points

How these facts were elicited

Referenced by (1)

Full triples — surface form annotated when it differs from this entity's canonical label.

Pierre de Fermat notableWork Fermat curve