Minimal submanifolds in $\mathbb{R}^4$ with a g.c.K. structure

Munteanu, Marian-Ioan

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Minimal submanifolds in $\mathbb{R}^4$ with a g.c.K. structure. (English). Czechoslovak Mathematical Journal, vol. 58 (2008), issue 1, pp. 61-78

MSC: 53B25, 53B35, 53C21, 53C42, 53C55 | MR 2402526 | Zbl 1174.53011

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Keywords:
locally conformal Kähler structure; minimal submanifolds; invariant submanifolds; totally real submanifolds; $CR$-submanifolds

Summary:
In this paper we obtain all invariant, anti-invariant and $CR$ submanifolds in $({\mathbb{R}}^4,g,J)$ endowed with a globally conformal Kähler structure which are minimal and tangent or normal to the Lee vector field of the g.c.K. structure.

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References:

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