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bn:00632043n
Noun Concept
Categories: Finsler geometry, Differential geometry
EN
spray
EN
In differential geometry, a spray is a vector field H on the tangent bundle TM that encodes a quasilinear second order system of ordinary differential equations on the base manifold M. Usually a spray is required to be homogeneous in the sense that its integral curves t→ΦHt∈TM obey the rule ΦHt=ΦHλt in positive reparameterizations. Wikipedia
English:
mathematics
Definitions
Sources
EN
In differential geometry, a spray is a vector field H on the tangent bundle TM that encodes a quasilinear second order system of ordinary differential equations on the base manifold M. Usually a spray is required to be homogeneous in the sense that its integral curves t→ΦHt∈TM obey the rule ΦHt=ΦHλt in positive reparameterizations. Wikipedia
A type of vector field in differential geometry defined on the tangent bundle of a manifold Wikipedia Disambiguation
Vector field on tangent bundle Wikidata
Wikipedia
EN
spray (mathematics)
Wikidata
EN
Spray

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