Fuchs and the theory of differential equations
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Publication:3320314
DOI10.1090/S0273-0979-1984-15186-3zbMath0536.01013WikidataQ56623409 ScholiaQ56623409MaRDI QIDQ3320314
Publication date: 1984
Published in: Bulletin of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://projecteuclid.org/euclid.bams/1183551413
Riemannsingular pointselliptic functionsKleinFrobeniusWeierstrassPoincaréHermiteFuchsian functionsBriot-BouquetThomé
History of mathematics in the 19th century (01A55) History of ordinary differential equations (34-03)
Related Items (8)
Picard–Fuchs ordinary differential systems in N=2 supersymmetric Yang–Mills theories ⋮ Unnamed Item ⋮ Polygons of Petrović and Fine, algebraic ODEs, and contemporary mathematics ⋮ Truncated solutions of Painlevé equation \({\mathrm P}_{\mathrm V}\) ⋮ CY-operators and $L$-functions ⋮ Algebraic aspects of hypergeometric differential equations ⋮ On an isomonodromy deformation equation without the Painlevé property ⋮ The Erlanger Programm of Felix Klein: Reflections on its place in the history of mathematics
Cites Work
- Das Riemann-Hilbertsche Problem der Theorie der linearen Differentialgleichungen
- Monodromy- and spectrum-preserving deformations. I
- First order algebraic differential equations. A differential algebraic approach
- From the history of a simple group
- Weierstraß and the theory of matrices
- The Casorati-Weierstrass theorem (studies in the history of complex function theory I)
- Le funzioni a periodi multipli nella corrispondenza tra Hermite e Casorati
- Der Nachlaß von Casorati (1835 - 1890) in Pavia
- On Second Order Linear Differential Equations with Algebraic Solutions
- Studies in the history of complex function theory. II: Interactions among the French school, Riemann, and Weierstrass
- Karl Weierstraß.
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