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bn:02461175n
Noun Concept
Categories: Vector bundles, Differential topology, Differential geometry, Differential operators, Generalizations of the derivative
EN
Lie algebroid
EN
In mathematics, a Lie algebroid is a vector bundle A → M {\displaystyle A\rightarrow M} together with a Lie bracket on its space of sections Γ {\displaystyle \Gamma } and a vector bundle morphism ρ : A → T M {\displaystyle \rho :A\rightarrow TM}, satisfying a Leibniz rule. Wikipedia
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EN
In mathematics, a Lie algebroid is a vector bundle A → M {\displaystyle A\rightarrow M} together with a Lie bracket on its space of sections Γ {\displaystyle \Gamma } and a vector bundle morphism ρ : A → T M {\displaystyle \rho :A\rightarrow TM}, satisfying a Leibniz rule. Wikipedia
The infinitesimal counterpart of Lie groupoids Wikipedia Disambiguation
Infinitesimal version of a Lie groupoid: manifold M with vector bundle E, vector bundle map ρ: E→TM, and a Lie bracket on sections of E, so that [s,ft] = (ρ(s)f)t+f[s,t] for any function f: M→ℝ and sections s, t of E Wikidata
IS A
Courant algebroid
algebraic structure
HAS PART
differentiable manifold
vector bundle
HAS KIND
Lie algebra
Atiyah algebroid
NAMED AFTER
Lie algebra
Lie groupoid
Sophus Lie
Wikipedia
EN
Lie algebroid
Wikidata
EN
Lie algebroid

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