bn:02461175n
Noun Concept
Categories: Differential topology, Geometry processing, Differential operators, Differential geometry, 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
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