On the generalized Jacobi-Kummer cyclotomic function

On the generalized Jacobi equation

The standard text-book Jacobi equation (equation of geodesic deviation) arises by linearizing the geodesic equation around some chosen geodesic, where the linearization is done with respect to the coordinates and the velocities. The generalized Jacobi equation, introduced by Hodgkinson in 1972 and further developed by Mashhoon and others, arises if the linearization is done only with respect to...

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The Generalized Jacobi Equation

The Jacobi equation in pseudo-Riemannian geometry determines the linearized geodesic flow. The linearization ignores the relative velocity of the geodesics. The generalized Jacobi equation takes the relative velocity into account; that is, when the geodesics are neighboring but their relative velocity is arbitrary the corresponding geodesic deviation equation is the generalized Jacobi equation....

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The Generalized Jacobi Equation

The Jacobi equation in pseudo-Riemannian geometry determines the linearized geodesic flow. The linearization ignores the relative velocity of the geodesics. The generalized Jacobi equation takes the relative velocity into account; that is, when the geodesics are neighboring but their relative velocity is arbitrary the corresponding geodesic deviation equation is the generalized Jacobi equation....

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Hodge Theory and Lagrangian Planes on Generalized Kummer Fourfolds

Suppose X is a smooth projective complex variety. Let N1(X,Z) ⊂ H2(X,Z) and N(X,Z) ⊂ H(X,Z) denote the group of curve classes modulo homological equivalence and the Néron-Severi group respectively. The monoids of effective classes in each group generate cones NE1(X) ⊂ N1(X,R) and NE(X) ⊂ N(X,R) with closures NE1(X) and NE 1 (X), the pseudoeffective cones. These play a central rôle in the birati...

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Hodge Theory and Lagrangian Planes on Generalized Kummer Fourfolds

Suppose X is a smooth projective complex variety. Let N1(X,Z) ⊂ H2(X,Z) and N(X,Z) ⊂ H(X,Z) denote the group of curve classes modulo homological equivalence and the Néron-Severi group respectively. The monoids of effective classes in each group generate cones NE1(X) ⊂ N1(X,R) and NE(X) ⊂ N(X,R) with closures NE1(X) and NE 1 (X), the pseudoeffective cones. These play a central rôle in the birati...

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On the generalized Jacobi-Kummer cyclotomic function

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On the generalized Jacobi equation

The Generalized Jacobi Equation

The Generalized Jacobi Equation

Hodge Theory and Lagrangian Planes on Generalized Kummer Fourfolds

Hodge Theory and Lagrangian Planes on Generalized Kummer Fourfolds

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