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bn:01208207n
Noun Concept
Categories: Riemannian geometry, Differential geometry, Structures on manifolds, long volume value
EN
calibrated geometry  Calibrated manifold  calibrated submanifold  Calibration
EN
In the mathematical field of differential geometry, a calibrated manifold is a Riemannian manifold of dimension n equipped with a differential p-form φ which is a calibration, meaning that: φ is closed: dφ = 0, where d is the exterior derivative for any x ∈ M and any oriented p-dimensional subspace ξ of TxM, φ|ξ = λ volξ with λ ≤ 1. Wikipedia
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EN
In the mathematical field of differential geometry, a calibrated manifold is a Riemannian manifold of dimension n equipped with a differential p-form φ which is a calibration, meaning that: φ is closed: dφ = 0, where d is the exterior derivative for any x ∈ M and any oriented p-dimensional subspace ξ of TxM, φ|ξ = λ volξ with λ ≤ 1. Wikipedia
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differential geometry
Wikipedia
EN
calibrated geometry
Wikidata
EN
calibrated geometry
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EN
Calibrated manifold, calibrated submanifold, Calibration (geometry)

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