Invariants for the Lagrangian Equivalence Problem
Abstract
Let M be a connected smooth manifold, let Aut(p) be the group automorphisms of the bundle p R× M R, and let q J1(R,M)× R J1(R,M) be the canonical projection. Invariant functions on Jr(q) under the natural action of Aut(p) are discussed in relationship with the Lagrangian equivalence problem. The second-order invariants are determined geometrically as well as some other higher-order invariants for M≥ 2.
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