On new examples of Hamiltonian-minimal and minimal Lagrangian submanifolds in Cn and CPn

Abstract

We propose a new method for the construction of Hamiltonian-minimal and minimal Lagrangian immersions of some manifolds in Cn and in CPn. By this method one can construct, in particular, immersions of such manifolds as the generalized Klein's bottle Kn, the multidimensional torus, Kn-1× S1, Sn-1× S1, and others. In some cases these immersions are embeddings. For example, it is possible to embed the following manifolds: K2n+1, S2n+1× S1, K2n+1× S1, S2n+1× S1× S1.

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