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In mathematics, especially in geometry and topology, an ambient space is the space surrounding a mathematical object along with the object itself. For example, a 1-dimensional line may be studied in isolation —in which case the ambient space of is , or it may be studied as an object embedded in 2-dimensional Euclidean space —in which case the ambient space of is , or as an object embedded in 2-dimensional hyperbolic space —in which case the ambient space of is . To see why this makes a difference, consider the statement "Parallel lines never intersect." This is true if the ambient space is , but false if the ambient space is , because the geometric properties of are different from the geometric properties of . All spaces are subsets of their ambient space.
See also
- Configuration space
- Geometric space
- Manifold and ambient manifold
- Submanifolds and Hypersurfaces
- Riemannian manifolds
- Ricci curvature
- Differential form
Further reading
- Schilders, W. H. A.; ter Maten, E. J. W.; Ciarlet, Philippe G. (2005). Numerical Methods in Electromagnetics. Vol. Special Volume. Elsevier. pp. 120ff. ISBN 0-444-51375-2.
- Wiggins, Stephen (1992). Chaotic Transport in Dynamical Systems. Berlin: Springer. pp. 209ff. ISBN 3-540-97522-5.
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This article includes a list of references related reading or external links but its sources remain unclear because it lacks inline citations Please help improve this article by introducing more precise citations May 2024 Learn how and when to remove this message In mathematics especially in geometry and topology an ambient space is the space surrounding a mathematical object along with the object itself For example a 1 dimensional line l displaystyle l may be studied in isolation in which case the ambient space of l displaystyle l is l displaystyle l or it may be studied as an object embedded in 2 dimensional Euclidean space R2 displaystyle mathbb R 2 in which case the ambient space of l displaystyle l is R2 displaystyle mathbb R 2 or as an object embedded in 2 dimensional hyperbolic space H2 displaystyle mathbb H 2 in which case the ambient space of l displaystyle l is H2 displaystyle mathbb H 2 To see why this makes a difference consider the statement Parallel lines never intersect This is true if the ambient space is R2 displaystyle mathbb R 2 but false if the ambient space is H2 displaystyle mathbb H 2 because the geometric properties of R2 displaystyle mathbb R 2 are different from the geometric properties of H2 displaystyle mathbb H 2 All spaces are subsets of their ambient space Three examples of different geometries Euclidean elliptical and hyperbolicSee alsoConfiguration space Geometric space Manifold and ambient manifold Submanifolds and Hypersurfaces Riemannian manifolds Ricci curvature Differential formFurther readingSchilders W H A ter Maten E J W Ciarlet Philippe G 2005 Numerical Methods in Electromagnetics Vol Special Volume Elsevier pp 120ff ISBN 0 444 51375 2 Wiggins Stephen 1992 Chaotic Transport in Dynamical Systems Berlin Springer pp 209ff ISBN 3 540 97522 5 This geometry related article is a stub You can help Wikipedia by expanding it vte
