Jacobi's inversion problem

E702055

Jacobi's inversion problem is a fundamental question in algebraic geometry and the theory of Abelian functions, concerning the inversion of Abelian integrals and the characterization of their multi-valued inverses.

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Jacobi's inversion problem canonical 1

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Predicate Object
instanceOf mathematical problem
problem in the theory of Abelian functions
asksFor characterization of multi-valued inverses of Abelian integrals
description of arguments of Abelian functions in terms of integrals
inversion of Abelian integrals
concerns recovery of divisor data from Abelian integrals
representation of points on a Jacobian by integrals of holomorphic differentials
field algebraic geometry
complex analysis
number theory
theory of Abelian functions
theory of Riemann surfaces
hasApplication construction of Abelian functions
explicit parametrization of algebraic curves
integrable systems
soliton theory
theory of algebraic curves
hasGeneralization inversion problems for higher-dimensional Abelian varieties
historicalPeriod 19th-century mathematics
influenced development of Riemann surface theory
development of modern algebraic geometry
theory of Abelian varieties
involvesConcept Abel's theorem NERFINISHED
Abelian functions NERFINISHED
Abelian integrals NERFINISHED
Abel–Jacobi map NERFINISHED
Jacobian variety NERFINISHED
Riemann surfaces NERFINISHED
divisors on algebraic curves
multi-valued inverse functions
periods of integrals
theta functions
namedAfter Carl Gustav Jacob Jacobi NERFINISHED
relatedTo Abel's addition theorem
Abel–Jacobi theory NERFINISHED
Jacobi variety NERFINISHED
Riemann's theta inversion theorem NERFINISHED
solvedBy Riemann's theory of Abelian integrals NERFINISHED
theory of theta functions
status classically solved

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Carl notableWork Jacobi's inversion problem
subject surface form: Carl Gustav Jacob Jacobi