Harmonic proper almost complex structures on Walker 4-maniforlds (Q2822175)
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scientific article; zbMATH DE number 6630240
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Harmonic proper almost complex structures on Walker 4-maniforlds |
scientific article; zbMATH DE number 6630240 |
Statements
27 September 2016
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harmonic almost complex structures
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Walker metric
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proper almost complex structure
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Harmonic proper almost complex structures on Walker 4-maniforlds (English)
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At first the authors define a Walker 4-manifold \( M \) endowed with a canonical neutral metric \( g \). It is known that \( M \) admits a proper almost complex structure \( J \) which can be written explicitly in appropriate local coordinates. In Theorem 3.1 a necessary and sufficient condition is found under which \( J \) is harmonic, i.e., \( [J, \nabla^{*} \nabla J] = 0 \), where \(\nabla^{*} \nabla \) is the rough Laplacian of \( (M,g)\).
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