Geometry and analytic theory of Frobenius manifolds.

Dubrovin, Boris

Displaying similar documents to “Geometry and analytic theory of Frobenius manifolds.”

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Lous H. Kauffman, Sóstences Lins (1991)

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To a given complex-analytic equidimensional corank-1 germ f, one can associate a set of integer 𝓐-invariants such that f is 𝓐-finite if and only if all these invariants are finite. An analogous result holds for corank-1 germs for which the source dimension is smaller than the target dimension.

On the asymptotic geometry of gravitational instantons

Vincent Minerbe (2010)

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We investigate the geometry at infinity of the so-called “gravitational instantons”, i.e. asymptotically flat hyperkähler four-manifolds, in relation with their volume growth. In particular, we prove that gravitational instantons with cubic volume growth are ALF, namely asymptotic to a circle fibration over a Euclidean three-space, with fibers of asymptotically constant length.

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Supplement to the paper "Improper intersections in complex analytic geometry" (Dissertationes Math. 391 (2001))

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B. Fine, P. Kirk, E. Klassen (1994)

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Curvature and the equivalence problem in sub-Riemannian geometry

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These notes give an introduction to the equivalence problem of sub-Riemannian manifolds. We first introduce preliminaries in terms of connections, frame bundles and sub-Riemannian geometry. Then we arrive to the main aim of these notes, which is to give the description of the canonical grading and connection existing on sub-Riemann manifolds with constant symbol. These structures are exactly what is needed in order to determine if two manifolds are isometric. We give three concrete examples,...

The Fujiki class and positive degree maps

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We show that a map between complex-analytic manifolds, at least one ofwhich is in the Fujiki class, is a biholomorphism under a natural condition on the second cohomologies. We use this to establish that, with mild restrictions, a certain relation of “domination” introduced by Gromov is in fact a partial order.

Behavior of Welschinger invariants under Morse simplifications

Erwan Brugallé, Nicolas Puignau (2013)

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Classical and quantum dilogarithmic invariants of flat $P S L (2, ℂ)$ -bundles over 3-manifolds.

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