Gauss–Manin connection
In mathematics, the Gauss–Manin connection, introduced by (Manin 1958), is a connection on a certain vector bundle over a family of algebraic varieties. The base space is taken to be the set of parameters defining the family, and the fibers are taken to be the de Rham cohomology group of the fibers V.
Flat sections of the bundle are described by differential equations; the best-known of these is the Picard–Fuchs equation, which arises when the family of varieties is taken to be the family of elliptic curves. In intuitive terms, when the family is locally trivial, cohomology classes can be moved from one fiber in the family to nearby fibers, providing the 'flat section' concept in purely topological terms. The existence of the connection is to be inferred from the flat sections.
Example
A commonly cited example is the Dwork construction of the Picard–Fuchs equation. Let
be the projective variety describing an elliptic curve. Here, is a free parameter describing the curve; it is an element of the complex projective line (the family of hypersurfaces in n − 1 dimensions of degree n, defined analogously, has been intensively studied in recent years, in connection with the modularity theorem and its extensions).[1] Thus, the base space of the bundle is taken to be the projective line. For a fixed in the base space, consider an element of the associated de Rham cohomology group
Each such element corresponds to a period of the elliptic curve. The cohomology is two-dimensional. The Gauss–Manin connection corresponds to the second-order differential equation
D-module explanation
In the more abstract setting of D-module theory, the existence of such equations is subsumed in a general discussion of the direct image.
Equations "arising from geometry"
The whole class of Gauss–Manin connections has been used to try to formulate the concept of differential equations that "arise from geometry". In connection with the Grothendieck p-curvature conjecture, Nicholas Katz proved that the class of Gauss–Manin connections with algebraic number coefficients satisfies the conjecture. This result is directly connected with the G-function concept of transcendental number theory, for meromorphic function solutions. The Bombieri-Dwork conjecture, also attributed to André, which is given in more than one version, postulates a converse direction: solutions as G-functions, or p-curvature nilpotent mod p for almost all p, means an equation "arises from geometry".[2][3]
References
- Hazewinkel, Michiel, ed. (2001), "g/g043470", Encyclopedia of Mathematics, Springer, ISBN 978-1-55608-010-4
- Manin, Ju. I. (1958), "Algebraic curves over fields with differentiation", Izvestiya Akademii Nauk SSSR. Seriya Matematicheskaya (in Russian) 22: 737–756, ISSN 0373-2436, MR 0103889 English translation in Manin, Ju. I. (1964) [1958], "Algebraic curves over fields with differentiation", American Mathematical Society translations: 22 papers on algebra, number theory and differential geometry 37, Providence, R.I.: American Mathematical Society, pp. 59–78, ISBN 978-0-8218-1737-7, MR 0103889