Higher order Grassmann fibrations and the calculus of variations

• Authors: KRUPKA Demeter; KRUPKA Michal
• Year of publication: 2010
• Type: Article in Periodical
• Magazine / Source: Balkan Journal of Geometry and its Applications
• MU Faculty or unit: Faculty of Science
• Field: General mathematics
• Keywords: Variational theory; velocity bundle; Grassmann bundle; Lepage form
• Description: Geometric structure of global integral variational functionals on higher order tangent bundles and Grassmann fibrations are investigated. The theory of Lepage forms is extended to these structures. The concept of a Lepage form allows us to introduce the Euler-Lagrange distribution for variational functionals, depending on velocities, in a similar way as in the calculus of variations on fibred manifolds. Integral curves of this distribution include all extremal curves of the underlying variational functional. The generators of the Euler-Lagrange distribution, defined by the Lepage forms of the first order, are found explicitly

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